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106216307

Measuring Productivity at the Industry Level - The India KLEMS Database

Contents
NEW ADDITIONS TO DATA MANUAL 2016 (Version 3)
Chapter 1: Introduction
1.1 Background
1.2 Coverage: Industries and Variables
Chapter 2: Gross Value Added Series at the Industry Level
2.1 Methodology
2.2 Implementation Procedure
2.3 Outstanding Issues
Chapter 3: Gross Output Series at the Industry Level
3.1 Methodology
3.2 Implementation Procedure
3.3 Outstanding Issues
Chapter 4: Labour Input Series at the Industry Level
4.1 Methodology
4.2 Implementation Procedure
4.3 Outstanding Issues
Chapter 5: Capital Input Series at the Industry Level
5.1 Methodology
5.2 Data and Sources
Chapter 6: Intermediate Input Series at the Industry Level
6.1 Methodology
6.2 Implementation Procedure
6.3 Outstanding Issues
Chapter 7: Factor Income Share Series at the Industry Level
7.1 Methodology for Measuring Labour Income Share Series
7.2 Implementation Procedure
7.3. Outstanding Issues
Chapter 8: Growth Accounting Methodology
8.1 Methodology for Measuring Productivity Growth at the Industry level
8.2 Methodology for Aggregation across Industries
8.3 Implementation Procedure
List of Appendixes
Appendix A: Concordance table of INDIA KLEMS industries (minimal) with NICs
Appendix B: Employment Unemployment Survey (EUS) rounds of NSS
Appendix C: Definitions of Employment in NSSO employment & unemployment surveys
Appendix D: Concordance table of KLEMS industries and IOTT industries
Appendix Table 1: Population, WFPR and Persons Employed in Different EUS Rounds
List of Tables
Table 1.1: Industrial Classification for Phase I and II of the Project
Table 1.2: Variables in INDIA KLEMS Multifactor Productivity Database for 27 Industries (Annual Time Series 1980-81 onwards)
Table 2.1: List of Manufacturing Industries for which GVA data is directly available from NAS
Table 2.2: List of Manufacturing Industries for which Gross Output data is obtained by adjusting data for NAS Industries
Table 3.1: List of Manufacturing Industries for which Gross Output is directly available from NAS
Table 3.2: List of Manufacturing Industries for which Gross Output data is obtained by adjusting data for NAS Industries
Table 5.1: Capital Asset Types in National Accounts Statistics and Corresponding Our Study Types
Table 5.2: Asset Types in ASI and India KLEMS
Table 5.3: Asset Categories in NSSO Rounds
Table 5.4: Depreciation Rate by Asset Type Used in the Computation of Capital Input
Table 7.1: NAS Sectors and Corresponding Study Industries, for Computation of Labour Income Share
Table 7.2: Industries and Groups for which ƞ (proportion of labour income out of mixed income) has been estimated
List of Box
Box 1: The Heckman model

AUTHORS

Deb Kusum Das
Department of Economics
Ramjas College
University of Delhi
Dkd_ramjas@yahoo.com

Abdul Azeez Erumban
The Conference Board Europe, Brussels
Groningen Growth and Development Center
Faculty of Economics and Business
University of Groningen
Abdul.Erumban@conference-board.org

Suresh Aggarwal
Retired Professor, Department of Business Economics
University of Delhi, South Campus
sureshchag@yahoo.com

Pilu Chandra Das
Kidderpore College
University of Calcutta
arpiludas@gmail.com


NEW ADDITIONS TO DATA MANUAL 2016 (Version 3)

The dataset includes measures of Gross Value Added (GVA), Gross Value of Output (GVO), Labour (L), Capital Stock (K), Energy (E), Material (M), Services (S), Labour Quality (LQ), Capital Composition (KQ) and Total Factor Productivity (TFP) at the industry level from 1980-81 to 2014-15.

Gross Value Added:

Up to 2011-12, estimates of GVA for all industries are directly obtained from Back Series 2011 and NAS 2014. Onwards 2012-13, GVA series are extended using annual growth rate estimated from NAS 2016 (this has been done because of the introduction of the new National Accounts series with base 2011-12).

NAS provide separate estimates of GVA for registered and unregistered manufacturing. However, onwards 2011-12 NAS disaggregated the manufacturing sector in corporate sector and household sector. For splitting the aggregate estimates of GVA for corporate sector, we have used data from the Annual Survey of Industries (ASI) based on the National Industrial Classification 2004 and 2008 (NIC-2004 & NIC-2008). For household sector we have used GVA data of Own Account Enterprises from 67th round (2010-11).

Gross Output:

Up to 2011-12, estimates of GVO for all industries are directly obtained from Back Series 2011 and NAS 2014. Onwards 2012-13 GVO series are extended using annual growth rate estimated from NAS 2016.

As motioned earlier, onwards 2011-12 NAS disaggregated the manufacturing sector in corporate sector and household sector. For splitting the aggregate estimates of GVO for corporate sector, we have used data from the Annual Survey of Industries (ASI) based on the National Industrial Classification 2004 and 2008 (NIC-2004 & NIC-2008). For household sector we have used GVO data of Own Account Enterprises from 67th round (2010-11).

Prior to 2011-12 National Accounts do not provide any estimates of gross output of service sectors and hence we rely on Input-output transaction tables which are available at an interval of 5 years. The input-output transaction tables for benchmark years of 1978-79, 1983-84, 1989-90, 1993-94, 1998-99, 2003-04, 2007-08 and 2013-14 (prepared by National Council of Applied Economic Research1 (NCAER)) are used to derive gross output series for service sectors.

Labour Input:

Labour input is measured by combining data on labour persons and labour composition. In the KLEMS framework it is desirable to estimate changes in labour composition by industries on the basis of age, gender and education.

We distinguish and three types of educational categories for each of 27 industries because of large data requirement at disaggregate level. While the three education categories used are ‘up to primary’, ‘above primary to higher secondary’, and ‘above higher secondary’. The three age groups used are 14-30, 30-49, above 49 years, and the two gender used are Males and Females.

Intermediate Input:

The Input-Output Transaction Tables for Benchmark years of 1978-79, 1983-84, 1989-90, 1993-94, 1998-99, 2003-04, 2007-08 and 2013-14 (prepared by National Council of Applied Economic Research2 (NCAER)) are used to calculate the proportions of Material Inputs, Energy Inputs, and Service Inputs in Total Intermediate Inputs.

Additional Information

The dataset also includes measures of gross value added, labour, capital stock, labour quality, capital composition and total factor productivity at the economy level from 1980-81 to 2014-15.

The dataset also includes measures of gross value added for organised and unorganised manufacturing industries from 1980-81 to 2011-12.

The dataset also includes measures of employment for three types of employment status – regular, casual and self-employed from 1980-81 to 2014-15.


Chapter 1: Introduction

1.1 Background

This document describes the procedures, methodologies and approaches used in constructing the India KLEMS database version 2016. This database is part of a research project, supported by the Reserve Bank of India (RBI), to analyze productivity performance in the Indian economy at disaggregate industry level. This work is meant to support empirical research in the area of economic growth. In addition the database is meant to support the conduct of policies aimed at supporting acceleration of productivity growth in the Indian economy, requiring comprehensive measurement tools to monitor and evaluate progress. Finally, the construction of the database would also support the systematic production of reliable statistics on growth and productivity using the methodologies of national accounts and input-output analysis.

In its definitive version the India KLEMS research project will include measures of economic growth, employment creation, capital formation and productivity at the industry level from 1980-81 onwards. The input measures will incorporate various categories of capital (K), labour (L), energy (E), materials (M) and services (S) inputs. A major advantage of growth accounts is that it is embedded in a clear analytical framework rooted in production functions and the theory of economic growth. It provides a conceptual framework within which the interaction between variables can be analyzed, which is of fundamental importance for policy evaluation. (Timmer et.al.2007)3.

The present document describes the India KLEMS database version 2016. The present version is an extended India KLEMS research project, “Disaggregate Industry-Level Productivity Analysis for India- the KLEMS Approach” being undertaken at the Centre for Development Economics, Delhi School of Economics. This one builds on the previous project, which was undertaken at ICRIER, New Delhi4. The Data Manual is intended to guide researchers about the variables (and their construction) used to measure both inputs and total factor productivity (TFP) at the industry level using the dataset. In addition, it is also intended to support national officials statistical agencies in future work on of the productivity database within the agencies.

The dataset includes measures of Gross Value Added (GVA), Gross Value of Output (GVO), Labour (L), Capital (K), Energy (E), Material (M), Services (S), Labour Quality (LQ), Labour Productivity (LP) and Total Factor Productivity (TFP) at the industry and economy level from 1980-81 onwards. The database covering the period 1980-81 to 2014-15 has been constructed on the basis of data compiled from CSO, NSSO, ASI, Input-Output tables (I-O tables) and processed according to appropriate procedures. These procedures were developed to ensure harmonization of the basic data, and to generate growth accounts in a consistent and uniform way. Harmonization of the basic data has focused on a number of areas such as industrial classification, aggregation levels. The database covers 27 industries comprising the entire Indian economy. The industries are shown in Table 1.1 below. The variables in the data set are given in Table 1.2.

1.2 Coverage: Industries and Variables

In this section we describe the coverage of the India KLEMS database in terms of industries and variables. In principle, the 35 year period from 1980-81 (1980) to 2014-15 (2011) is covered. At a disaggregated level, database is created for 27 industries. The industrial classification is constructed by building concordance between NIC 2008, NIC 2004, NIC 1998, NIC 1987 and NIC 1970 so as to generate continuous time series from 1980 to 2014. This classification is very close to the International Standard Industrial Classification (ISIC) revision 3. The 27 industries are aggregated to form six broad sectors, namely:

  • Agricultural, Hunting, Forestry and Fishing
  • Mining and Quarrying
  • Manufacturing
  • Electricity, Gas and Water supply
  • Construction
  • Services

Table 1.1 below provides a listing of the 27 industries, including the higher aggregates. Further the detailed classification and concordance of study industries with NICs is provided in Appendix table A.

Table 1.1: Industrial Classification for INDIA KLEMS Database 2015
Sl. No. Description of Industry
1 Agriculture, Hunting, Forestry and Fishing
2 Mining and Quarrying
3-15 MANUFACTURING SECTOR
3 Food Products, Beverages and Tobacco
4 Textiles, Textile Products, Leather and Footwear
5 Wood and Products of Wood
6 Pulp, Paper, Paper Products, Printing and Publishing
7 Coke, Refined Petroleum Products and Nuclear Fuel
8 Chemicals and Chemical Products
9 Rubber and Plastic Products
10 Other Non-Metallic Mineral Products
11 Basic Metals and Fabricated Metal Products
12 Machinery, n.e.c.
13 Electrical and Optical Equipment
14 Transport Equipment
15 Manufacturing, n.e.c.; recycling
16 Electricity, Gas and Water Supply
17 Construction
18-27 SERVICE SECTOR
18 Trade
19 Hotels and Restaurants
20 Transport and Storage
21 Post and Telecommunication
22 Financial Intermediation
23 Business Services
24 Public Administration and Defense; Compulsory Social Security
25 Education
26 Health and Social Work
27 Other Services
Source: Prepared by authors following EU KLEMS
n.e.c.: not elsewhere classified

Table 1.2 provides an overview of all the series included in our database. Measures of capital (K), labour (L), energy (E), material (M) and service (S) inputs as well as gross output (GO), have been constructed using National Accounts Statistics (NAS), Annual Survey of Industries (ASI), NSSO rounds and Input-Output Tables (IO). In building annual time series on gross output, five inputs and factor income shares, various assumptions are made to fill up gaps in industry details and link series over time. As we know that NSSO rounds of unregistered manufacturing, input-output transaction tables, and employment and unemployment surveys by nsso are available only for certain benchmark years. Thus, the use of information from these data sources necessitates interpolation and assumption of constant shares for building series of output and inputs. The construction of growth accounting series like total factor productivity, labour productivity are based on theoretical models of production and needs additional assumptions that are spelt out in subsequent chapters of the manual. Finally, the other series like NDP at factor cost, compensation of employees etc. are additional series which are used in generating the growth accounts and are informative by themselves.

Table 1.2: Variables in our Multifactor Productivity Database for 27 Industries
(Annual Time Series 1980-81 onwards)
Variable Description
GVA
Gross value added (GVA) at current prices
Gross value added (GVA) at constant prices
Annual growth rate in GVA (in per cent)
GVO
Gross value of output (GVO) at current prices
Gross value of output (GVO) at constant prices
Annual growth rate in GVO (in per cent)
Labour Input
Labour employment persons
Growth rate of labour employed (in per cent)
Labour quality index
Growth rate of labour quality index
Growth rate of labour input
Labour income share in GVA
Labour income share in GVO
Capital Input
Growth rate of capital stock (in per cent)
Growth rate in capital services
Capital income share in GVA
Capital income share in GVO
Energy Input
Energy input series
Share of energy input in GVO
Material Input
Material input series
Share of material input in GVO
Service Input
Service input series
Share of service input in GVO
TFP (MFP)
Growth of total factor productivity (in per cent)
 
Appendix Table A: Concordance table of study industries (minimal) with Different NICs (National Industrial Classifications)
Sl. No. KLEMS Code Description
(NIC & KLEMS)
NIC 2008 NIC 2004 NIC 1998 NIC 87 NIC70
1 A to B Agriculture, Forestry and Fishing 0111+ 0112+ 0113+ 0114+ 0115+ 0116+ 0119+ 0121+ 0122+ 0123+ 0124+ 0125+ 0126+ 0127+ 0128+ 0129+ 0130+ 0141+ 0142+ 0143+ 0144+ 0145+ 0146+ 0149+ 0150+ 0161+ 01+ 62+ 01631+ 01633+ 01639+ 0164+ 0170+ 0210 + 0220+ 0230+ 0240+ 0311+ 0312+ 0321+ 0322 0111+ 0112+ 0113+ 0121+ 0122+ 0130+ 01401+ 01402+ 01403+ 01404+ 01406+ 01407+ 01408+ 01409+ 0150+ 0200+ 0501+ 0502 0111+ 0112+ 0113+ 0121+ 0122+ 0130+ 01401+ 01402+ 01403+ 01404+ 01406+ 01407+ 01409+ 0150+ 0200+ 0500 000+ 001+ 002+ 003+ 004+ 005+ 006+ 008+ 009+ 012+ 013+ 018+ 007+ 010+ 011+ 014+ 015+ 016+ 017+ 019+ 020+ 021+ 022+ 023+ 024+ 025+ 026+ 027+ 029+ 030+ 031+ 032+ 033+ 034+ 035+ 036+ 037+ 039+ 040+ 050+ 051+ 052+ 053+ 054+ 059+ 060+ 061+ 062+ 063+ 064+ 069 000+ 001+ 002+ 003+ 004+ 005+ 006+ 008+ 012+ 013+ 018+ 007+ 010+ 011+ 014+ 015+ 016+ 017+ 019+ 020+ 021+ 022+ 023+ 024+ 025+ 026+ 029+ 030+ 031+ 032+ 033+ 034+ 035+ 036+ 039+ 040+ 050+ 051+ 052+ 053+ 054+ 059+ 060+ 061+ 062+ 063+ 069
2 C Mining and Quarrying 0510+ 0520+ 0610+ 0620+ 0710+ 0721+ 0729+ 0810+ 0891+ 0892+ 0893+ 0899+ 0910+ 0990 1010+ 1020+ 1030+ 1110+ 1120+ 1200+ 1310+ 1320+ 1410+ 1421+ 1422+ 1429 1010+ 1020+ 1030+ 1110+ 1120+ 1200+ 1310+ 1320+ 1410+ 1421+ 1422+ 1429 100+ 101+ 102+ 110+ 111+ 190+ 140+ 120+ 130+ 131+ 132+ 133+ 134+ 135+ 136+ 137+ 138+ 139+ 150+ 151+ 152+ 153+ 154+ 155+ 156+ 159 100+ 101+ 110+ 111+ 120+ 121+ 122+ 123+ 124+ 125+ 126+ 127+ 128+ 129+ 190+ 191+ 192+ 193+ 194+ 195+ 199
3 15 to 16 Food and Beverages and Tobacco 1010+ 1020+ 1030+ 1040+ 1050+ 1061+ 1062+ 1071+ 1072+ 1073+ 1074+ 1075+ 1079+ 1080+ 1101+ 1102+ 1103+ 1104+ 1200 1511+ 1512+ 1513+ 1514+ 1520+ 1531+ 1532+ 1533+ 1541+ 1542+ 1543+ 1544+ 1549+ 1551+ 1552+ 1553+ 1554+ 1600 1511+ 1512+ 1513+ 1514+ 1520+ 1531+ 1532+ 1533+ 1541+ 1542+ 1543+ 1544+ 1549+ 1551+ 1552+ 1553+ 1554+ 1600 200+ 203+ 202+ 210+ 211+ 212+ 201+ 204+ 218+ 217+ 205+ 206+ 207+ 209+ 213+ 214+ 215+ 219+ 220+ 223+ 221+ 222+ 216+ 224+ 225+ 226+ 227+ 228+ 229 200+ 203+ 202+ 210+ 211+ 212+ 201+ 204+ 217+ 205+ 206+ 207+ 209+ 213+ 214+ 215+ 219+ 220+ 223+ 221+ 222+ 216+ 224+ 225+ 226+ 227+ 228+ 229+ 315
4 17 to 19 Textiles, Textile Products and Leather and Footwear 1311+ 1312+ 1313+ 1391+ 1392+ 1393+ 1394+ 1399+ 14101+ 14102+ 14103+ 14104+ 14109+ 1420+ 1430+ 1511+ 1512+ 1520+ 01632 1711+ 1713+ 1712+ 1714+ 1721+ 1722+ 1725+ 1723+ 1724+ 1729+ 1730+ 18101+ 18102+ 18103+ 18104+ 18109+ 1820+ 1911+ 1912+ 1920+ 01405 1711+ 1712+ 1721+ 1722+ 1723+ 1729+ 1730+ 18101+ 18102+ 18103+ 18104+ 18109+ 1820+ 1911+ 1912+ 1920+ 01405 230+ 231+ 232+ 233+ 234+ 235+ 240+ 241+ 242+ 244+ 245+ 247+ 250+ 251+ 252+ 253+ 254+ 255+ 256+ 236+ 243+ 246+ 248+ 257+ 258+ 259+ 267+ 268+ 263+ 264+ 261+ 262+ 269+ 260+ 265+ 266+ 292+ 294+ 295+ 296+ 290+ 293+ 299+ 291+ 311 230+ 231+ 232+ 233+ 234+ 235+ 236+ 240+ 241+ 242+ 243+ 245+ 246+ 247+ 248+ 244+ 250+ 251+ 252+ 253+ 259+ 260+ 261+ 262+ 263+ 264+ 265.2+ 265.3+ 266+ 267+ 268.1+ 268.2+ 269+ 290+ 291+ 292+ 293+ 294+ 295+ 296+ 299+ 301+ 239+ 249
5 20 Wood and Of Wood and Cork 1610+ 1621+ 1622+ 1623+ 1629 2010+ 2021+ 2022+ 2023+ 2029 2010+ 2021+ 2022+ 2023+ 2029 270+ 271+ 272+ 273+ 274+ 275+ 279 271+ 270+ 273+ 272+ 274+ 275+ 279
6 21 to 22 Pulp, Paper & Paper Products & Printing and Publishing 1701+ 1702+ 11709+ 1811+ 1812+ 1820+ 5811+ 5812+ 5813+ 5819 2101+ 2102+ 2109+ 2211+ 2212+ 2213+ 2219+ 2221+ 2222+ 2230 2101+ 2102+ 2109+ 2211+ 2212+ 2213+ 2219+ 2221+ 2222+ 2230 280+ 281+ 282+ 283+ 285+ 284+ 286+ 289+ 287+ 288 280+ 281+ 282+ 283+ 285+ 284+ 286+ 289+ 287+ 288
7 23 Coke, Refined Petroleum and Nuclear Fuel 1910+ 1920 2310+ 2320+ 2330 2310+ 2320+ 2330 318+ 319+ 314+ 315+ 316+ 317 304+ 305+ 306+ 307
8 24 Chemicals and Chemical Products 2011+ 2012+ 2013+ 2021+ 2022+ 2023+ 2029+ 2030+ 2100+ 2680 2411+ 2412+ 2413+ 2421+ 2422+ 2423+ 2424+ 2429+ 2430 2411+ 2412+ 2413+ 2421+ 2422+ 2423+ 2424+ 2429+ 2430 300+ 301+ 302+ 303+ 304+ 305+ 208+ 307+ 308+ 309+ 306 208+ 310+ 311+ 312+ 313+ 314+ 316+ 317+ 318+ 319
9 25 Rubber and Plastics 2211+ 2219+ 2220 2511+ 2519+ 2520 2511+ 2519+ 2520 310+ 312+ 313 300+ 302+ 303
10 26 Other Non-Metallic Mineral 2310+ 2391+ 2391+ 2394+ 2395+ 2396+ 2399 2610+ 2691+ 2692+ 2693+ 2694+ 2695+ 2696+ 2699 2610+ 2691+ 2692+ 2693+ 2694+ 2695+ 2696+ 2699 321+ 322+ 323+ 320+ 324+ 327+ 326+ 325+ 329 320+ 321.1+ 321.2+ 321.3+ 321.4+ 321.6+ 321.7+ 321.9+ 322+ 323+ 324+ 325+ 326+ 327+ 328+ 329
11 27 to 28 Basic Metals and Fabricated Metal Products 2410+ 2420+ 2431+ 2432+ 2511+ 2512+ 2513+ 2591+ 2592+ 2593+ 2599 2711+ 2712+ 2713+ 2714+ 2715+ 2716+ 2717+ 2718+ 2719+ 2720+ 2731+ 2732+ 2811+ 2812+ 2813+ 2891+ 2892+ 2893+ 2899 2710+ 2720+ 2731+ 2732+ 2811+ 2812+ 2813+ 2891+ 2892+ 2893+ 2899 330+ 331+ 332+ 333+ 334+ 335+ 336+ 337+ 338+ 339+ 340+ 341+ 343+ 344+ 345+ 346+ 349+ 352 330+ 331+ 332+ 333+ 334+ 335+ 336+ 339+ 340+ 341+ 343+ 344+ 345+ 349+ 352
12 29 Machinery, N.e.c. 2520+ 2750+ 2811+ 2812+ 2813+ 2814+ 2815+ 2816+ 2817+ 2818+ 2819+ 2821+ 2822+ 2823+ 2824+ 2825+ 2826+ 2229+ 3040+ 3311+ 3312 2911+ 2912+ 2913+ 2914+ 2915+ 2919+ 2921+ 2922+ 2923+ 2924+ 2925+ 2927+ 2929+ 2930 2911+ 2912+ 2913+ 2914+ 2915+ 2919+ 2921+ 2922+ 2923+ 2924+ 2925+ 2927+ 2929+ 2930 355+ 364+ 388+ 350+ 351+ 353+ 354+ 356+ 357+ 359+ 390+ 391+ 392+ 393+ 397+ 399 350+ 351+ 353+ 354+ 356+ 357+ 359+ 355+ 363.1+ 363.2+ 363.5+ 363.6+ 363.7+ 363.8+ 363.9
13 30 to 33 Electrical and Optical Equipment 2610+ 2620+ 2630+ 2651+ 2652+ 2660+ 2670+ 2710+ 2720+ 2731+ 2732+ 2733+ 2740+ 2790+ 3250+ 3314+ 3319+ 3320+ 9512+ 9521 3000+ 3110+ 3120+ 3130+ 3140+ 3150+ 3190+ 3210+ 3220+ 3250+ 3311+ 3312+ 3313+ 3320+ 3330 3000+ 3110+ 3120+ 3130+ 3140+ 3150+ 3190+ 3210+ 3220+ 3250+ 3311+ 3312+ 3313+ 3320+ 3330 358+ 367+ 360+ 395+ 361+ 362+ 363+ 369+ 368+ 365+ 396+ 366+ 380+ 381+ 382 321.5+ 358+ 360+ 361+ 362+ 363.3+ 363.4+ 364+ 365+ 366+ 367+ 369+ 380+ 381+ 382
14 34 to 35 Transport Equipment 2910+ 2920+ 2930+ 3011+ 3012+ 3020+ 3030+ 3091+ 3092+ 3099+ 3315 3410+ 3420+ 3430+ 3511+ 3512+ 3520+ 3530+ 3591+ 3592+ 3599 3410+ 3420+ 3430+ 3511+ 3512+ 3520+ 3530+ 3591+ 3592+ 3599 373+ 374+ 370+ 371+ 372+ 377+ 375+ 376+ 378+ 379 373+ 374+ 370+ 371+ 372+ 377+ 375+ 376+ 378+ 379
15 36 to 37 Manufacturing N.e.c., Recycling 3100+ 3211+ 3212+ 3220+ 3230+ 3240+ 3290+ 3830 3610+ 3691+ 3692+ 3693+ 3694+ 3699+ 3710+ 3720 3610+ 3691+ 3692+ 3693+ 3694+ 3699+ 3710+ 3720 276+ 277+ 342+ 383+ 384+ 386+ 385+ 387+ 389 265.1+ 276+ 277+ 342+ 383+ 384+ 385+ 386+ 387+ 389
16 E Electricity Gas & Water supply 3510+ 3520+ 3530+ 3600 4010+ 4020+ 4030+ 4100 4010+ 4020+ 4030+ 4100 400+ 401+ 430+ 431+ 432+ 439+ 410+ 420 400+ 401+ 410+ 420
17 F Construction 4100+ 4210+ 4220+ 4290+ 4311+ 4312+ 4321+ 4322+ 4329+ 4330+ 4390 4510+ 4520+ 4530+ 4540+ 4550 4510+ 4520+ 4530+ 4540+ 4550 191+ 199+ 500+ 501+ 502+ 503+ 504+ 505+ 506+ 509+ 510+ 511+ 514+ 519+ 512+ 513+ 515 500+ 501+ 502+ 503+ 504+ 505+ 509+ 510+ 511+ 512+ 513+ 514+ 519
18 50 to 52 Trade 4510+ 4520+ 4530+ 4540+ 4610+ 4620+ 4630+ 4641+ 4649+ 4651+ 4652+ 4653+ 4659+ 4730+ 9200+ 4711+ 4719+ 4721+ 4722+ 4723+ 4741+ 4742+ 4751+ 4752+ 4753+ 4759+ 4761+ 4762+ 4763+ 4764+ 4771+ 4772+ 4773+ 4774+ 9522+ 9523+ 9529 5010+ 5020+ 5030+ 5040+ 5050+ 5110+ 5121+ 5122+ 5131+ 5139+ 5141+ 5142+ 5143+ 5149+ 5151+ 5152+ 5159+ 5190+ 5211+ 5219+ 5220+ 5231+ 5232+ 5233+ 5234+ 5239+ 5240+ 5251+ 5252+ 5259+ 5260 5010+ 5020+ 5030+ 5040+ 5050+ 5110+ 5121+ 5122+ 5131+ 5139+ 5141+ 5142+ 5143+ 5149+ 5150+ 5190+ 5211+ 5219+ 5220+ 5231+ 5232+ 5233+ 5234+ 5239+ 5240+ 5251+ 5252+ 5259+ 5260 623+ 686+ 398+ 974+ 682+ 640+ 641+ 642+ 649+ 600+ 603+ 604+ 605+ 601+ 606+ 607+ 608+ 609+ 612+ 611+ 615+ 617+ 618+ 622+ 630+ 631+ 634+ 636+ 637+ 639+ 613+ 614+ 619+ 610+ 632+ 633+ 602+ 616+ 638+ 620+ 621+ 635+ 684+ 685+ 840+ 688+ 841+ 650+ 651+ 652+ 653+ 654+ 655+ 656+ 659+ 687+ 660+ 661+ 671+ 672+ 673+ 674+ 675+ 679+ 683+ 670+ 676+ 680+ 681+ 689+ 970+ 971+ 972+ 973+ 975+ 979 632+ 683+ 973+ 600+ 601+ 602+ 603+ 604+ 605+ 606+ 607+ 608+ 610+ 611+ 612+ 613+ 620+ 621+ 622+ 623+ 630+ 631+ 640+ 641+ 642+ 643+ 644+ 645+ 646+ 647+ 649+ 682+ 821+ 650+ 651+ 652+ 653+ 654+ 655+ 656+ 659+ 660+ 661+ 670+ 671+ 672+ 673+ 674+ 675+ 676+ 679+ 681+ 684+ 680+ 689+ 971+ 972+ 974+ 975+ 979
19 H Hotels and Restaurants 5510+ 5520+ 5590+ 5610+ 5621+ 5629+ 5630 5510+ 5520 5510+ 5520 691+ 690 691+ 690
20 60 to 63 Transport and Storage 4911+ 4912+ 4921+ 4922+ 4923+ 4930+ 5011+ 5012+ 5021+ 5022+ 5100+ 5120+ 5210+ 5229+ 7911+ 7912+ 7990+ 5211+ 5222+ 5223+ 5224 6010+ 6021+ 6022+ 6023+ 6030+ 6110+ 6120+ 6210+ 6220+ 6301+ 6302+ 6303+ 6304+ 6309 6010+ 6021+ 6022+ 6023+ 6030+ 6110+ 6120+ 6210+ 6220+ 6301+ 6302+ 6303+ 6304+ 6309 700+ 701+ 702+ 709+ 703+ 704+ 705+ 706+ 707+ 710+ 711+ 720+ 730+ 731+ 732+ 740+ 741+ 749+ 708+ 712+ 721+ 737+ 738+ 739 700+ 701+ 702+ 703+ 704+ 705+ 706+ 707+ 708+ 710+ 711+ 712+ 720+ 721+ 730+ 740+ 741+ 749
21 64 Post & telecom- munications 5310+ 5320+ 6110+ 6120+ 6130+ 6190 6411+ 6412+ 6420 6411+ 6412+ 6420 750+ 751+ 752+ 759 750+ 751+ 759
22 J Financial Intermediation 6411+ 6419+ 6420+ 6430+ 6491+ 6492+ 6499+ 6511+ 6512+ 6520+ 6530+ 6611+ 6612+ 6619+ 6621+ 6622+ 6629+ 6630+ 7740 6511+ 6519+ 6591+ 6592+ 6599+ 6601+ 6602+ 6603+ 6711+ 6712+ 6719+ 6720 6511+ 6519+ 6591+ 6592+ 6599+ 6601+ 6602+ 6603+ 6711+ 6712+ 6719+ 6720 800+ 801+ 802+ 803+ 804+ 811+ 810+ 819+ 812 800+ 801+ 809+ 811+ 810+ 819
23 71-74 Business Services 6201+ 6202+ 5820+ 6209+ 6311+ 6312+ 6339+ 6910+ 6920+ 7010+ 7020+ 7110+ 7210+ 7310+ 7410+ 7120+ 7220+ 7320+ 7420+ 7490+ 7710+ 7721+ 7722+ 7729+ 7730+ 7810+ 7820+ 7830+ 8010+ 8020+ 8030+ 8110+ 8121+ 8129+ 8211+ 8219+ 8220+ 8230+ 8291+ 8292+ 8299+ 8550+ 9511 7111+ 7112+ 7113+ 7121+ 7122+ 7123+ 7129+ 7130+ 7210+ 7221+ 7229+ 7230+ 7240+ 7250+ 7290+ 7310+ 7320+ 7411+ 7413+ 7414+ 7421+ 7422+ 7430+ 7491+ 7492+ 7493+ 7494+ 7495+ 7499 7111+ 7112+ 7113+ 7121+ 7122+ 7123+ 7129+ 7130+ 7210+ 7220+ 7230+ 7240+ 7250+ 7290+ 7310+ 7320+ 7411+ 7413+ 7414+ 7421+ 7422+ 7430+ 7491+ 7492+ 7493+ 7494+ 7495+ 7499 733+ 734+ 850+ 736+ 735+ 851+ 853+ 852+ 854+ 892+ 394+ 922+ 830+ 891+ 893+ 894+ 895+ 896+ 898+ 890+ 899+ 963 822+ 823+ 824+ 825+ 826+ 827+ 829+ 830+ 922+ 963
24 L Public Admin & Defence; Compulsory Social Security 8411+ 8412+ 8413+ 84211+ 8422+ 8423+ 8430 7511+ 7512+ 7513+ 7514+ 7521+ 7522+ 7523+ 7530 7511+ 7512+ 7513+ 7514+ 7521+ 7522+ 7523+ 7530 900+ 901+ 902+ 903 900+ 901+ 902+ 903
25 M Education 8510+ 8521+ 8522+ 8530+ 8541+ 8542+ 8549 8010+ 8021+ 8022+ 8030+ 8090 8010+ 8021+ 8022+ 8030+ 8090 921+ 920 921+ 920
26 N Health and Social Work 8610+ 8620+ 8690+ 8710+ 8720+ 8730+ 8790+ 8810+ 8890+ 7500 8511+ 8512+ 8519+ 8520+ 8531+ 5520+ 8532 8511+ 8512+ 8519+ 8520+ 8531+ 8532 930+ 931+ 941 930+ 931+ 941
27 O Other Services 6810+ 6820+ 9311+ 9312+ 9319+ 9321+ 9329+ 9411+ 9412+ 9420+ 9491+ 9492+ 9499+ 9601+ 9602+ 9603+ 9609+ 9700+ 9810+ 9820+ 9900+ 3811+ 3812+ 3821+ 3822+ 3900+ 3700+ 5911+ 5912+ 5913+ 5914+ 9000+ 6391+ 6010+ 8541+ 14105+ 6020+ 9101+ 9102+ 9103+ 8130+ 5920 7010+ 7020+ 9000+ 9111+ 9112+ 9120+ 9191+ 9192+ 9232+ 9199+ 9211+ 9212+ 9213+ 9214+ 9219+ 9220+ 9231+ 9233+ 9241+ 9249+ 9301+ 9302+ 9303+ 9309+ 9500+ 9600+ 18105 7010+ 7020+ 9000+ 9111+ 9112+ 9191+ 9199+ 9211+ 9212+ 9213+ 9214+ 9219+ 9120+ 9192+ 9220+ 9231+ 9232+ 9233+ 9241+ 9249+ 9301+ 9302+ 9303+ 9309+ 9500+ 18105 820+ 910+ 942+ 940+ 943+ 949+ 950+ 951+ 954+ 952+ 953+ 955+ 958+ 897+ 957+ 956+ 959+ 961+ 962+ 969+ 990+ 960+ 980+ 964 820+ 828+ 910+ 940+ 942+ 949+ 950+ 951+ 952+ 953+ 954+ 955+ 956+ 959+ 961+ 962+ 969+ 990+ 960
Source: Prepared by authors using Central Statistical Office (CSO) reports, India

Chapter 2: Gross Value Added Series at the Industry Level

For an individual firm or industry, productivity measure can be based on a value-added concept where value added is considered as an industry’s output and only primary inputs such as labour and capital are considered as industry input. Value-added based productivity measures reflect an industry’s capacity to contribute to economy-wide income and final demand. In this sense they are valid complements to gross output-based measures. This chapter describes the data sources and methodology used to construct the Gross Value Added (GVA) series at current and constant prices for 27 study industries for the period of 1980-81 (1980) to 2014-15 (2014).

2.1 Methodology

GVA of a sector is defined as the value of output less the value of its intermediary inputs. This value-added created by a sector is shared among the primary factors of production, labour and capital. The National Accounts Statistics (NAS) brought out by the CSO (Central Statistics Office, Government of India) is the basic source of data for the construction of series on gross value added for INDIA KLEMS-industries. NAS provides estimates of GVA for Indian economy at a disaggregated industry level at both current and constant (2004-05) prices for the period since 1950-51. Up to 2011-12, estimates of GVA for all industries are directly obtained from Back Series 2011 and NAS 2014. Onwards 2012-13, GVA series are extended using annual growth rate estimated from NAS 2016 (this has been done because of the introduction of the new National Accounts series with base 2011-12). NAS estimates of value added for a few industry groups are at a more aggregate level, requiring the splitting of the aggregates. In such cases, the NAS estimates of value added have been split to obtain estimates of value added at a higher level of disaggregation.

NAS provide separate estimates of GVA for registered and unregistered manufacturing. However, onwards 2011-12 NAS disaggregated the manufacturing sector in corporate sector and household sector. For splitting the aggregate estimates of GVA for registered manufacturing industries and corporate sector, we have used data from the Annual Survey of Industries (ASI) based on the National Industrial Classification 2004 and 2008 (NIC-2004 & NIC-2008). Whereas, for the unregistered manufacturing sector, we have used results from six rounds of NSSO surveys- [40th (1984-85), 45th round (1989-90), 51st round (1994-95), 56th round (2000-01), 62nd round (2005-06) and 67th round (2010-11)] to obtain value-added estimates. In India, GDP for unregistered manufacturing is constructed using the labour input method. The estimates of GVA for the unregistered manufacturing sector are obtained as a product of the workforce and the corresponding GVA per worker. The information about employment in the unorganized sector is only available in the benchmark years for which NSSO survey data are available. Therefore, there is no consistent source of employment data for the years between these quinquennial surveys. Even the information on value added per worker is equally limited, since the value-added data are also updated on an approximate 5-year interval (for details, see CSO, 2007). Therefore, estimates of value added for the unregistered manufacturing sectors for the years between the benchmarks have been obtained by interpolation and for years outside the benchmark years by linear extrapolation. For splitting the aggregate estimates of GVA for household sector for recent years (i.e. 2012 onwards), we have used GVA data of Own Account Enterprises from 67th round (2010-11).

2.2 Implementation Procedure

The construction of Gross valued added series involves three steps.

Step 1: A concordance table between the classification used in the NAS and the 27 study industry classification used for this project has been prepared. Further, concordance between all the 27 sectors has been constructed with NIC- 1970, 1987, 1998, 2004 and 2008. Out of the 27 study industries, for 20 industries, Gross Value Added series both in current and constant prices is directly available from NAS5. The sectors for which data are provided in NAS are Agriculture, Forestry & logging, Fishing, Mining and Quarrying, Manufacturing (registered and unregistered), Electricity, Construction, Trade, Hotels & Restaurants, Railways, Transport by other means, Storage, Communication, Banking & insurance, Real estate, Ownership of Dwelling & Business Services, Public Administration & Defense and Other Services.

Step 2: For manufacturing industries where direct estimates of GVA were not available from NAS, estimates have been made using additional information from ASI and NSSO unorganized manufacturing data. For 6 out of 13 manufacturing sectors GVA data are directly available from NAS. The list of these industries is provided in the table below.

Table 2.1: List of Manufacturing Industries for which GVA data is directly available from NAS
Industry No. NIC 98 Industry code Industry Description
3 15 to 16 Food and Beverages and Tobacco
4 17 to 19 Textiles, Textile Products, Leather and Footwear
6 21 to 22 Pulp, Paper, Paper Products, Printing and Publishing
8 24 Chemicals and Chemical Products
10 26 Other Non-Metallic Mineral Products
14 34 to 35 Transport Equipment
Source: National Account Statistics (NAS) reports.

For the remaining 7 industries GVA data is constructed by splitting the NAS data using ASI or NSSO distributions. ASI data (annual) has been used for registered manufacturing whereas interpolated ratios from NSSO 40th (1984-85), 45th (1989-90), 51st (1994-95), 56th (2000-01) 62nd (2005-06) and 67th round (2010-11) rounds have been used for Unregistered Manufacturing segments. A list of study industries is presented in Table 2.2 showcasing the methodology used to split GVA of certain NAS sectors to match concordance with our classification. Once the nominal estimates of are obtained then they are deflated with suitable WPI deflators to arrive at constant price series.

Table 2.2: List of Manufacturing Industries for which Gross Output data is obtained by adjusting data for NAS Industries
Industry No. Industry description NAS industry description Methodology
5 wood & products of wood (20) wood & wood products, furniture, fixtures etc (20+361) From 1980 to 2003 Gross Output of NAS sector (20+361) is split using ASI and NSSO distributions.
Since 2004-05 NAS provides separate series for 20 and 361
7 coke, refined petroleum & nuclear fuel (23) Rubber & petroleum products (23+25) Used ASI and NSSO proportions to split Gross Output of NAS sector (23+25) into separate 23 and 25. Since 2011-12 NAS provides separate series for 23 and 25.
9 rubber & plastic products (25) rubber & petroleum products(23+25) same as above
11 basic metals & fabricated metal products (27+28) basic metals (271+272+2731+2732) Use ASI and NSSO proportions to split 28, 29 and 30.
metal products & machinery (28+29+30) Add fraction of 28 to basic metals (27)obtained from NAS
12 machinery, n.e.c. (29) metal products & machinery (28+29+30) Use ASI data to split GVO of NAS sector Metal products and machinery (28+29+30) to separate 29 from 28+29+30
13 electrical & optical equipment (30 to 33) electrical machinery (31+32) Split GVO of NAS sector Metal Products and machinery (28+29+30) using ASI proportions.
Add fraction of 30 to electrical machinery (31+32) obtained from NAS
15 manufacturing n.e.c.; recycling (36+37) other manufacturing(33 +369) Split GVO of NAS sector Other manufacturing (33+369) using ASI proportions.
recycling (371+372) Add fraction of 36 and 361 to Recycling (371+372)
Note: * The figures in parentheses are two digit NIC 98 codes.
Source: National Account Statistics (NAS), Annual Survey of Industries (ASI) and National Sample Survey Organisation.

Prior to 1998-99, summation of NAS published GVA estimates for disaggregate manufacturing sector does not tally with aggregate manufacturing estimates. So it will be worthwhile to note that our aggregate estimates of GVA in manufacturing are made consistent with the overall estimate of gross value added in the NAS. Also it is important to note that the industry level value-added volume indices are based on NAS. CSO provides single deflated value-added estimates for all sectors except Agriculture. Following are the details of steps taken in splitting NAS sectors into India KLEMS industries for which direct Gross Value Added series are not available.

Wood and wood products and manufacturing of furniture

NAS back-series 2011 (based on 2004-05 prices) provides GVA of wood & wood products, furniture, fixtures etc. (20+361) for registered and unregistered manufacturing sectors. Since 2004-05 (from NAS2011 onwards) we have separate series for wood & wood products (20) and manufacturing of furniture & fixtures (361). For our study, we need these two industries separately and 20 would be India KLEMS sector 20 and 361 would be part of India KLEMS Manufacturing n.e.c. and Recycling (36+37) i.e. 361 would be added to 369+37. Thus since 1999-00, we have used the separate GVA series of wood & wood products (20) and manufacturing of furniture (361) obtained directly from NAS disaggregated series of registered and unregistered statement of GDP by economic activity. NAS back-series 2011 of GVA of wood & wood products, furniture, fixtures etc. (20+361) for registered manufacturing from 1980-81 to 2003-04 has been split using the ratio of GVA at current price of wood & wood product (20) to manufacturing of furniture (361) obtained from Annual Survey of Industries (ASI). In case of unorganized manufacturing GVA for these two industries, separate GVA series have been obtained by using the ratio created from NSS unorganized manufacturing surveys of the benchmark years. The ratio of GVA for the interim years between two benchmark years have been linearly interpolated till 2003-04, and from 1980-81 to 1984-85, the ratio of 1984-85 has been used.6

Coke, Refined Petroleum Products and Nuclear Fuel and Rubber and Plastic Products

We split ‘rubber, petroleum products’ (which are clubbed under one group in NAS) to arrive at two industry groups i.e., coke, refined petroleum products & nuclear fuel (23) and rubber & plastic products (25). For the organized segment, we use the ASI (annual) data to get the individual sector shares and split the NAS data using these individual shares. Likewise, we use the relevant data from the four NSS surveys mentioned earlier to get the individual sector shares for the unorganized segment of this sector. The ratio of GVA for the interim years between two benchmark years have been linearly interpolated till 2003-04, and from 1980-81 to 1984-85, the ratio of 1984-85 has been used.

Basic Metals and Fabricated Metal Products

In our industry classification, basic metals & fabricated metal products (27+28) and machinery (29) are separate groups whereas ‘manufacture of fabricated metal products’ (28); ‘manufacture of machinery & equipment n.e.c’ (29) and ‘manufacture of office, accounting & computing machinery’ (30) are clubbed together as metal products & machinery (28, 29 and 30) in NAS. To arrive at individual industry result, we use ASI shares for organized sectors and NSSO surveys for the unorganized sector. We add to the fraction of fabricated metal products (28) from metal products & machinery to basic metals (271+272+2731+2732) already available.

Electrical and Optical Equipment

In our study classification, ‘electrical & optical equipment’ includes all sectors from 30 to 33. However, ‘electrical machinery’ in NAS includes industries ‘manufacture of electrical machinery & apparatus n.e.c.’ (31) + ‘manufacture of radio, television & communication equipment & apparatus’ (32) and excludes ‘manufacture of office, accounting & computing machinery’ (30) and ‘manufacture of medical, precision & optical instruments’ (33). However, 30 is part of ‘metal products & machinery’ and 33 is part of ‘other manufacturing’ in NAS. We take out 28 from metal products & machinery in NAS, with 29 and 30 being left, which we split using ASI. NSSO surveys have been useful here as well to compute the unorganized segment share. Likewise, we also take out the share of 33 from ‘other manufacturing’ in NAS separately for both organized and unorganized segments to arrive at gross value added for electrical and optical equipment.

Step 3: According to India KLEMS, output is adjusted for Financial Intermediation Services Indirectly Measured (FISIM). The value of such services forms a part of the income originating in the banking and insurance sector and, as such, is deducted from the GVA. The NAS provides output net of FISIM for some industry groups at a more aggregate level. For instance, in the estimates of GVA obtained for the registered manufacturing sector, adjustment for FISIM in NAS is made only at the aggregate level in the absence of adequate details at a disaggregate level. However, we have allocated FISIM to all the sectors of manufacturing by redistributing total FISIM across sectors proportional to their sectoral GDP shares. Similar redistribution of FISIM has been done in case of Trade sector and Other Services sector.

2.3 Outstanding Issues

First, the value added series presented in the project are at factor cost (as published in NAS), however, according to the KLEMS methodology as adopted in EU KLEMS, value-added data has to be presented in basic prices as adopted in System of National Accounts 1993 (SNA 1993). However, the basic price is the amount receivable by the producer from the purchaser for a unit of a good or service produced as output minus any tax payable, and plus any subsidy receivable, on that unit as a consequence of its production or sale. It excludes any transport charges invoiced separately by the producer.

Secondly, in order to make international comparisons, we need to convert the given ‘GDP at factor cost’ to ‘GDP in basic prices’. For this, we require net indirect taxes on production (indirect taxes less subsidies) for 27 industries and for every year since 1980. At present, we have GDP at basic prices from 2004-05 to 2014-15 for some industries of India KLEMS, which has been provided to us by CSO according to the NAS industrial classification. Since the information about indirect taxes and subsidies is not readily available for 27 study industries and also for the given time period, the challenge is to extend the series backwards by splitting up aggregate indirect taxes and subsidies data.

Chapter 3: Gross Output Series at the Industry Level

This chapter describes the procedures and methodologies used in constructing the database for gross output series at the industry level over the period 1980-81(1980) to 2014-15(2011). We discuss both the raw data sources and the adjustments that have been made to generate the time series on output and value added consistent with the official National Accounts. The methodology for measuring industry output, and value added was developed by Jorgenson, Gallop and Fraumeni (1987) and extended by Jorgenson (1990 a). Following a similar approach as explained in Jorgenson et al. (2005, Chapter 4) and Timmer et al. (2010, Chapter 3), the time series on gross output and intermediate inputs for the Indian economy have been constructed.

3.1 Methodology

The gross output of an industry is defined as the value of industrial production using primary factors like labour, capital and intermediate inputs purchased from other industries. The gross output production function is separable in inputs and technology. An important advantage of gross output approach is that it provides a complete measure of production and treats all inputs - labour, capital and intermediate inputs symmetrically. In contrast the value-added measure of output does not explicitly account for the flow of intermediate inputs which may be the primary component of an industry’s output. We use the more restrictive value-added concept primarily because it is useful for aggregation purposes. It is to be noted that aggregate output (aggregated over industry value added), is a value-added concept and the detailed methodology of aggregation of output across industries is explained in chapter 8.

To construct the gross output series at industry level we use multiple data sources namely National Accounts Statistics, Annual Survey of Industries, NSSO rounds for unorganized manufacturing and input-output transaction tables. The data source and methodology used are documented below:

National Accounts Statistics:

The National Accounts Statistics (NAS) published by the CSO (Central Statistics Office, Government of India) is the basic source of data for the construction of time series on gross output. NAS provides estimates of gross output (GVO) for Indian economy at a disaggregated industry level at current and constant (2004-05) prices since 1950-51. Gross output data is available in NAS for agriculture, mining and quarrying, construction and manufacturing sectors (registered and unregistered manufacturing). Up to 2011-12, estimates of GVO for all industries are directly obtained from Back Series 2011 and NAS 2014. Onwards 2012-13 GVO series are extended using annual growth rate estimated from NAS 2016.

(a) Filling procedures of National Accounts series: It is to be noted that the NAS estimates of gross output for a few industry groups are at a more aggregate level, requiring splitting of the aggregates. In such cases, NAS estimates of output have been split using additional information from Annual Survey of Industries and NSSO rounds of unregistered manufacturing to obtain estimates at higher level of disaggregation. Secondly, for unregistered manufacturing gross output data is available in NAS from 2004-05 onwards. In this case, information from NSSO survey rounds has been used for missing years to derive output estimates of unregistered manufacturing industries at current and constant prices.

Annual Survey of Industries and NSSO Quinquennial Survey Reports:

As mentioned above, gross output data are available at a more disaggregated level in Annual Survey of Industries (ASI) and NSSO quinquennial surveys for registered and unregistered manufacturing industries, respectively. These secondary data sources are used in this study for two purposes: (a) in certain cases NAS provides combined estimates of GVO and GVA for two manufacturing industries. In such cases separate estimates for individual study industries are obtained with the help of ASI or NSSO unorganized manufacturing sector data. (b) For the period prior to 2001, NAS does not provide estimates of GVO for unorganized manufacturing industries. To make our estimate of GVO for this period, the NSSO data are used.

The major NSSO rounds for unregistered manufacturing used are 40th round (1984-85), 45th round (1989-90) and 51st round (1994-95), 56th round (2000-01) and 62nd round (2005-06).

Input-Output Transaction Tables:

As mentioned earlier, for gross value added series of service sectors we obtain our estimates from NAS. However, prior to 2011-12 National Accounts do not provide any estimates of gross output of service sectors and hence we rely on input-output transaction tables which are available at an interval of 5 years or so. This necessitates interpolation and assumption of constant shares for measuring output of services sectors. The input-output transaction tables for benchmark years of 1978-79, 1983-84, 1989-90, 1993-94, 1998-99, 2003-04, 2007-08 and 2013-14 (prepared by National Council of Applied Economic Research7 (NCAER)) are used to derive gross output series for service sectors. 2011-12 onwards GVO series are extended using annual growth rate obtained from NAS 2014.

3.2 Implementation Procedure

The construction of the gross output series from 1980 to 2014 at current and constant prices involves the following steps:

Step 1: Measuring Gross Output of Agricultural Sector, Mining and Quarrying, and Construction

NAS provides nominal and real GVO series for a) crops & plantation, b) animal husbandry c) forestry & logging d) fishing. By aggregating the GVO of these four subsectors we derive the GVO of agricultural sector. The gross output estimates of mining & quarrying & construction at current and constant prices from 1980-2014 is also directly taken from NAS.

Step 2: Measuring Gross Output of Manufacturing Industries

For manufacturing industries time series on gross output is obtained by adding the magnitudes for registered and unregistered segments of manufacturing. As mentioned earlier, NAS estimates of gross output for manufacturing industries are at a more aggregate level. In such cases the aggregate output of NAS at current prices has been split using additional information from ASI and NSSO unorganized sector reports. Gross output data for 6 out of 13 manufacturing industries listed in table 3.1 are directly picked up from NAS.

Table 3.1: List of Manufacturing Industries for which Gross Output is directly available from NAS
Industry No. NIC 98 Industries Industry Description
3 15 to 16 Food and Beverages and Tobacco
4 17 to 19 Textiles, Textile Products, Leather and Footwear
6 21 to 22 Pulp, Paper, Paper Products, Printing and Publishing
8 24 Chemicals and Chemical Products
10 26 Other Non-Metallic Mineral Products
14 34 to 35 Transport Equipment
Source: National Account Statistics (NAS) reports.

For the remaining 7 sectors output is constructed by splitting the NAS output data using ASI or NSSO distributions. ASI data (annual) has been used for registered manufacturing whereas interpolated ratios from NSSO 56th (2000-01), 62nd (2005-06) and 67th (2010-11) rounds have been used for Unregistered Manufacturing segments. A list of study industries is presented in Table 3.2 showcasing the methodology used to split GVO of certain NAS sectors to match concordance with our classification.

Table 3.2: List of Manufacturing Industries for which Gross Output data is obtained by adjusting data for NAS Industries
Industry No Industry description NAS industry description Methodology
5 wood & products of wood (20) wood & wood products, furniture, fixtures etc. (20+361) From 1980 to 2003 Gross Output of NAS sector (20+361) is split using ASI and NSSO distributions.
Since 2004-05 NAS provides separate series for 20 and 361
7 coke, refined petroleum & nuclear fuel (23) rubber, petroleum products (23+25) Used ASI and NSSO proportions to split Gross Output of NAS sector (23+25) into separate 23 and 25
9 rubber & plastic products (25) rubber, petroleum products(23+25) same as above
11 basic metals & fabricated metal products (27+28) basic metals (271+272+2731+2732) Use ASI and NSSO proportions to split 28, 29 and 30.
metal products & machinery (28+29+30) Add fraction of 28 to Basic metals (27)obtained from NAS
12 machinery, n.e.c. (29) metal products & machinery (28+29+30) Use ASI data to split GVO of NAS sector Metal products and machinery(28+29+30) to separate 29 from 28+29+30
13 electrical & optical equipment (30 to 33) electrical machinery (31+32) Split GVO of NAS sector Metal Products and machinery (28+29+30) using ASI proportions.
Add fraction of 30 to Electrical machinery (31+32) obtained from NAS
15 manufacturing n.e.c.; recycling (36+37) other manufacturing (33 +369) Split GVO of NAS sector Other manufacturing (33+369) using ASI proportions.
recycling (371+372) Add fraction of 36 and 361 to Recycling (371+372)
Note: * The figures in parenthesis are two digit NIC 98 classifications.
Source: NAS, ASI and NSSO reports.

The detailed method of splitting the output of NAS sectors to derive output of individual industries is given as follows:

Basic Metals and Fabricated Metal Products; Machinery, n.e.c.; Electrical and Optical Equipment

Metal products and machinery of NAS is split into three parts: manufacture of fabricated metal products, manufacture of machinery and equipment, manufacturing of office accounting and computing machinery. For registered segments individual industry shares from ASI are used to split the data. For unregistered segments sectoral shares are calculated from 56th (2000-01), 62nd (2005-06) and 67th (2010-11) NSSO rounds of unregistered manufacturing. The shares for interim years have been estimated by interpolation and applied to the combined output of NAS to split it into three industries. Machinery forms a separate study sector. Next, a fraction of manufacture of fabricated metal products is added to basic metals of NAS to form output for study sector basic metals and fabricated metal products. A fraction of manufacturing of office accounting and computing machinery is added with electrical machinery and manufacture of medical and optical instruments to form electrical and optical equipment sector.

Coke, Refined Petroleum Products and Nuclear Fuel; Rubber and Plastic Products

We split ‘rubber, petroleum products’ (which are clubbed under one group in NAS) to arrive at two industry groups, i.e., coke, refined petroleum products and nuclear fuel (23) and rubber and plastic products (25). For the registered segment, we use the ASI (annual) data to get the individual sector shares and split the NAS data using these individual shares. Likewise, we use the relevant data from the four NSS surveys mentioned earlier to get the individual sector shares for the unregistered segment of this sector.

Wood and Products of Wood; Manufacturing n.e.c.; recycling

NAS back-series 2011 (based on 2004-05 prices) provides GVO of wood and wood products, furniture, fixtures etc (20+361) for registered and unregistered manufacturing segments. Since 2004-05 (from NAS2011 onwards) we have separate series for wood and wood products (20) and manufacturing of furniture & fixtures (361). In our study, wood & wood products (20) form a separate industry. Manufacturing of furniture & fixture (361) adds up with manufacturing n.e.c.8 (369) and recycling (37) to form study industry manufacturing n.e.c. and recycling. Thus since 2004-05, we have used the separate output series of wood & wood products (20) and manufacturing of furniture (361) obtained directly from NAS disaggregated series of registered and unregistered statement of GDP by economic activity. Prior to 2003, we use ASI data for registered segments to spit the NAS sectors to arrive at estimates of individual study industry.

However, for the period prior to 2003, separate output estimates for unregistered manufacturing segments are not available in NAS. Thus, to estimate output of unregistered manufacturing for the period 1980 to 2003 the following has been done.

  • GVO to GVA ratios is obtained from NSSO survey reports, for 1984-85 (40th Round), 1989-90 (45th round), 1994-95 (51st round) and 2000-01 (56th round). GVO to GVA ratio for the time point 1999 is directly picked up from NAS.

  • Ratios are linearly interpolated between five data points 1984, 1989, 1994, 2001 and 2004 (calculated from NAS) and applied to GVA series of NAS to obtain GVO series consistent with NAS from 1984 to 2003.

  • The ratios of NSSO 40th round are taken backwards to derive output numbers for the period 1980 to 1984.

  • The nominal estimates of output for manufacturing sectors are then deflated with suitable WPI deflators to arrive at the constant price series.

Step 4: Measuring Gross Output for Services Sectors and Electricity, Gas and water supply

Gross output series for services sectors and sector electricity, gas and water supply has been constructed using information from input-output transaction tables of the Indian economy published by CSO.

  • GVO to GVA ratios for Services sectors are obtained from IOTT benchmark years of 1978-79, 1983-84, 1989-90, 1993-94, 1998-99, 2003-04, 2007-08, and 2013-14.

  • These ratios are linearly interpolated for intervening years and applied to GVA series of NAS to derive the output estimates consistent with NAS both at current and constant prices.

  • It is to be noted that for government-owned sector public administration and defense no intermediate inputs are given in IOTT tables. Consequently value added to output ratio from the System of National Accounts (SNA) tables have been applied to real and nominal GVA figures of NAS to estimate the output for this sector.

Thus the above Steps 1 to 4 give a time series of gross output for the 27 study industries from 1980 to 2014at current prices and constant prices.

3.3 Outstanding Issues

Firstly, the present study provides estimates for manufacturing and its sub-branches without segregating manufacturing (and its sub-branches) into organized and unorganized segments. However given the employment potential and sizable presence of the unorganized segment in many of the manufacturing industries, it would be worthwhile in Indian context to examine separately the productivity performances of both the organized and unorganized components. Some work to construct the output and input series separately for organized and unorganized components of Indian manufacturing has been done. A paper based on this analysis has been prepared. The data series for organized and unorganized manufacturing is not included in this release of India KLEMS database.

Finally, National Accounts do not provide any estimates of gross output of services sector and hence we rely on input-output transaction tables which are available at an interval of about 5 years. This necessitates interpolation and assumption of constant shares for measuring output of services sectors. This issue is analogous to those explained in Timmer et al. (2010, Chapter 3) for the EU economy. Griliches (1994) paid particular attention to service sector output as a key source of uncertainty.

Chapter 4: Labour Input Series at the Industry Level

This chapter provides information on the sources of data and method of measuring labour services. The aim is to estimate labour input so that it reflects the actual changes in the quantity (number of persons) and quality of labour input over time.

4.1 Methodology

Labour input is measured by combining data on labour persons and data on education. In the KLEMS framework it is desirable to estimate changes in labour composition by industries on the basis of age, gender and education. The measurement of labour composition is essentially an attempt to distinguish one labour type from the other taking into account the embodied human capital in each person. The source of human capital could be through investment in education, experience, training, etc. The contribution to output by each person also comes from this embodied capital and the reward (wages and earnings) to each person also includes the reward for investment in human capital. Therefore, it is essential to separate out these differences in labour to clearly understand the underlying differences in labour characteristics. It is in this context that an initiative has been taken to estimate labour composition index. Nevertheless, many limitations of India’s employment statistics, especially the availability of information on wages/ earnings of different category of workers which could be used as an indication of their differences in ability makes it difficult to quantify these changes in the labour force in a pertinent way. The problems of employment statistics in India has been widely discussed in the literature (Sivasubramonian; 2004, & Himanshu; 2011). The KLEMS project aims to build a time series of employment series for 27 industrial sectors. However, there exists no time-series data on Indian economy, except for the organized segment. Therefore, it was essential to make certain assumptions regarding the annual changes in the employment series using available information. Subsequently we discuss these issues in detail.

The large-scale Employment and Unemployment Surveys (EUS) by National Sample Survey Organization (NSSO)9 and the estimated population series based on the decennial population census are the main data sources for estimating the workforce by industry groups, as per the National Industrial Classification (NIC). Interpolated population is used for intervening years.

In India, major or quinquennial rounds of EUS which have been conducted by NSSO since 1980 are 38th (1983), 43rd (1987-88), 50th (1993-94), 55th (1999-2000), 61st (2007-08), 66th (2009-10), and 68th (2011-12) rounds. The major round 32nd (1977-78) has been used for extrapolating the labour series to 1980-81. Since 1989-90, the NSSO has also conducted annual surveys with small sample sizes. While the annual surveys or thin rounds have shorter reference periods, six months in some cases, they also have limited coverage. The thin rounds relate to both rural and urban sectors of the economy. So while some economists have preferred to ignore them almost completely (Sundaram, 2007), others have supported their use (Bhalla and Das, 2005; Srinivasan, 2008). Because of the limitations of thin rounds10, they have not been used in constructing the time series of labour input.

In the NSS surveys, the workers are classified on the basis of their activity status into usual principal status (UPS), usual principal and subsidiary status (UPSS), current weekly status (CWS) and current daily status (CDS) for quinquennial rounds (also known as major rounds) and Usual Status & CWS for annual rounds (also known as thin rounds). While UPS, UPSS and CWS measure number of persons, the CDS gives number of person-days. UPSS is the most liberal and widely used of these concepts and despite its limitations11 this seems to be the best measure to use given the data. UPSS, which includes all workers who have worked for a longer time of the preceding 365 days in either the principal or in one or more subsidiary economic activity has been used because of its advantages over others. Advantages of using UPSS, which gives number of persons employed, are: i) It provides more consistent and long-term trend, ii) More comparable over the different EUS rounds, iii) NAS’s labour input method (LIM) is also now based on Principal and Subsidiary Status, and iv) Wider agreement on its use for measuring employment (Visaria, 1996; Bosworth, Collins & Virmani (BCV), 2007; Sundaram, 2008; Rangarajan, 2009).

NSSO has used National Industrial Classification (NIC) 1970 for classification of workers by industry in 38th and 43rd rounds, NIC 1987 for 50th round, NIC 1998 for 55th and 61st rounds, NIC 2004 for 66th round and NIC 2008 for 68th round. Therefore as a starting point concordance between India KLEMS 27 sector industrial classification, and NIC-1970, 1987, 1998, 2004 and 2008 was worked out.

There are, however, some data problems which need a mention:

  1. The educational categories in the 38th and 43rd round did not have a separate classification for higher secondary (Hr. Sec.) and was introduced for the first time in the 50th round. Hence, the categories are not exactly comparable in the six rounds. For this reason, we combined the secondary and higher secondary categories into a category of secondary to higher secondary. The labour composition index has been computed using five education categories12 namely- up to primary, primary, middle, secondary & higher secondary, and above higher secondary. There are thus five types of persons employed for each of the 27 study industries.

  2. There are also some conceptual differences between NSSO major rounds in the way employment and unemployment status of a person is defined.

  3. The problem of concordance between NIC and our study is observed in the first two rounds, i.e. 38th and 43rd. While the concordance required is at 4 digits for NIC 1970, but the codes used in NSSO surveys are in 3 digits, so proportional bifurcation has been done for some industries, e.g. NIC 265, 321 and 363 into two KLEMS groups. It may also be mentioned that for these rounds and the 50th round there is no complete specification of the principal and subsidiary industry for all the UPSS employed persons. It is 99.71 per cent, 97.9 per cent and 99.39 per cent in 38th, 43rd and 50th rounds respectively. Also, to maintain consistency with NAS and the earlier rounds, custom tailoring, which is included in manufacturing in 55th, 61st and 66th rounds by NSSO, has been included in services in these three rounds also. Similarly to maintain consistency with NAS, we have consistently included cotton ginning in textiles, textile products (industry group 3) in all the NSSO rounds.

Measuring labour Persons at the Industry Level

The construction of time series of labour input requires estimation of numbers of persons. While in India number of persons has been used as a measure of labour input, OECD (2001) and EU KLEMS have estimated labour- productivity in terms of output per labour hour worked. OECD does not favour using count of jobs and has published international comparisons of productivity for OECD countries that uses unadjusted hours. Efforts are made to estimate persons and adjust it for changes in labour composition by calculating the grand labour composition index, thus obtaining the composition change corrected labour input.

The methodological issue is how to estimate number of persons employed. In India the total workforce in the country and its distribution over economic activities may be obtained from the decennial population census and the employment and unemployment surveys (EUS) of the NSSO13. Out of the two, the latter are more dependable and have been used to assess the changes in employment and unemployment for employment planning and policy analysis. The preference for the use of EUS is generally based on the notion that prior to 2001, the three Censuses have clearly under-reported the participation of women in economic activities; whereas the EUS has provided reasonably reliable estimates of the level and pattern of employment (Visaria, 1996). While population census underestimates workforce participation rates (WPRs), the EUS estimates of total population are significantly lower than the population census-based estimates – by over 20 percent in urban India14. However, for the census 2001, the WFPRs are closer to the rates from the 1999-2000 NSSO round. Due to these advantages of EUS, the present study has also used only the EUS.15 Since 2011-12, the Labour Bureau, GOI has also started collecting annual data on employment and unemployment and has released reports till 2013-14. But its estimates are not comparable with EUS and the unit level data, which is used to get employment by different characteristics-age, gender, education, etc. is also not provided. So this data source has also not been used in India KLEMS so far.

Measuring Labour Composition Index

The composition of labour force is of considerable importance in the context of productivity measurement, as it provides not only a more accurate indication of the contribution of labour to production but also the impact of compositional changes on productivity. Any improvement in labour skills or if proportions of each labour type in the labour force change, will have an impact on the growth of labour input beyond any change in total persons worked. It would increase the amount of labour input actually used in the process of production.

One widely used methodology to capture changes in labour composition is given by Jorgenson, Gollop and Fraumeni; 1987, which is that the aggregate labour input Lj of sector ‘j’ is defined as a Törnqvist volume index of persons worked by individual labour types ‘l’ as follows:16

 

The first term on the right-hand side Δln LCj indicates the change in labour composition and the second term indicates the change in total persons worked in sector ‘j’. It can easily be seen that if proportions of each labour type in the labour force change, this will have an impact on the growth of labour input beyond any change in total persons worked. The index of aggregate labour composition measures the changes in the sex-age-education-occupation composition of the economy. It is the partial index corresponding to all characteristics. The use of this method is, however, data intensive.

There is a second approach to the measurement of skill levels. The procedure is to use a simple index of educational attainment to adjust for skill differences. So improvement in educational attainment is adjusted by incorporating average years of schooling as the proxy for skill levels. For example, an index of the form: L* = eas L assumes that each year of schoolings, raises the average worker’s productivity by a constant percentage, ‘a’. Such studies have been carried out for different time periods and for a large number of countries around the world, typically finding a return to each additional year of education in the range of 7 to 12 percent (BCV, 2007).

Most of the recent indices of composition of labour input are based on the methodology of Jorgenson, Gollop & Fraumeni (JGF, 1987) and uses the Törnqvist translog index. However, this methodology requires large volume of data. Using this methodology Aggarwal (2004) estimated labour composition for the Indian manufacturing labour force.

There are however, lot of disagreements on the use of this methodology in the Indian context, as it assumes the existence of perfectly competitive labour markets where wage rate is the indicator of a person’s marginal productivity. The analysts argue that the observed wage differences may reflect factors other than productivity differences, such as age or gender. Its use is also questioned because data for large segment of Indian labour force- the self -employed is not available. Since the Indian labour market is still not very competitive and there are data weaknesses, therefore the researchers in India have generally avoided applying the JGF methodology. For this reason, most Indian researchers have avoided to account for the differences in age and gender characteristics. However, to account for educational differences they have preferred to exercise either of the two choices- one to use Barrow & Lee (1993) methodology and presume a constant rate of return for education (BCV, 2007) or second is to use the limited information available on wages for few rounds and only for casual and regular employees (Sivasubramonian, 2004) to determine the weights of different types of persons.

Bosworth & Collins (2008) assumed a constant annual return of 7 per cent for each additional year of education irrespective of the level of education. The problem with the assumption of uniform returns for each year is that it ignores all variations- across levels of education, over gender, over age groups, over industries, etc. and only includes education. It is thus not able to capture the impact of change in gender composition, age composition (a proxy for experience) and industry composition.

The present version of the manual and report now has included some of these characteristics. So a grand labour composition index, an education, an age and a gender labour composition index have been estimated based on JGF methodology using suitable data.

4.2 Implementation Procedure

The data on employment is essentially derived from the unit level record data of National Sample Survey (NSS) which is made available by NSSO in the form of CD-ROMS for the five quinquennial rounds beginning from 38th. We estimated the number of employed persons according to UPSS as follows:

  1. Work participation rates (WPRs) by UPSS from EUS are applied to the corresponding period’s census population17 of rural male, rural female, urban male and urban female to find out the number of persons employed in the four segments

  2. The 27-industry distribution of Employment from EUS is applied to the number of persons employed in step I to obtain Lij for each industry where i=1 for rural and 2 for urban sectors, and j=1 for male and 2 for female

  3. Total persons in a year are obtained for each industry as the sum of the Lij over gender and sectors, ΣiΣjLij

For extrapolation backward to 1980-81 to 1982-83, the interpolation of the broad industrial classification of 32nd round and 38th round is used. So the estimates from 32nd round are mainly used as control numbers.

For the construction of the four labour composition indices we require data on employment and earnings by education, age and gender for the broad sectors and for each of the 27 industries. We distinguish five types of educational categories for broad sectors and three types of educational categories for each of 27 industries because of large data requirement at disaggregate level. While the five education categories used are ‘below primary’, ‘primary’, ‘middle’, ‘secondary & higher secondary’, and ‘above higher secondary’, the three are ‘up to primary’, ‘above primary to higher secondary’, and ‘above higher secondary’. The three age groups used are 14-30, 30-49, above 49 years, and the two gender used are males and females. Table 4.1 below summarizes all this.

Table 4.1: Classification Categories of Labour Force for Broad Sectors and each Industry
Classification No. Categories
Gender 2 Males, Females
Age groups 3 14-30, 30-49, above 49
Education 5* Below Primary, Primary, Middle, Secondary and Higher Secondary, above Higher Secondary
3** Up to Primary, above primary to Higher Secondary, above Higher Secondary
*For broad Sectors
** For 27 KLEMS industries and organized & unorganized manufacturing industries.

Therefore the following additional steps have also been performed:

  1. The first step involves computing the proportions of the distribution of persons employed by the five educational groups for all the major rounds.

  2. These proportions are then applied to the number of employed persons in different industries to obtain the distribution of persons by education groups.

  3. The earnings data is estimated from NSSO which relates it mainly to regular and casual persons employed. It may however be mentioned that even for these two groups, for a large number of persons employed, the wages are either missing or given as zero.

  4. For earnings of self-employed persons18, two approaches have been adopted. Firstly, a Mincer wage equation has been estimated and the sample selection bias is corrected for by using the Heckman’s19 two step procedure. The function has been applied to the earnings of casual and regular employees where the earnings have been regressed on the dummies of age, gender, education, location, marital status, social exclusion and industry. The identification factors used in the first stage are age, gender, and marital status, type of household/size of household. The corresponding earnings of the self-employed are obtained as the predicted value with similar traits. The average wages per day are then computed for persons employed of different type of employment, i.e. self-employed, regular and casual combined together; whose wages are more than zero.

    Secondly, earnings of self-employed have also been estimated from the monthly consumption expenditure of these households. In this, first the total monthly consumption expenditure is divided by the number of employed persons in the household to get total monthly consumption expenditure per employed person. Then the ratio of wage earnings to total monthly consumption expenditure per employed person has been calculated for each industry by UPSS status. Assuming the consumption earnings ratio to be same for casual and self-employed persons, the ratio for casual labour is used for self-employed persons and this ratio is multiplied to the total monthly consumption expenditure per self-employed person so as to get the earnings of the self-employed persons. However, if the earnings thus obtained are higher than the earnings obtained from Mincer equation, then the latter are used. So the lower of the two- earnings -obtained from Mincer equation or the earnings based on consumption expenditure, are taken to be the earnings of the self-employed persons.

Once the above steps are taken to find out educational distribution of all employed persons in all the six rounds and their corresponding wages, the computation of the labour education index is carried based on the JGF (1987) methodology with 1980-81 equal to 100. The education index is estimated for total persons working in 27 different industries in India for the 38th, 43rd, 50th, 55th, 61st 66th, and 68throunds of NSSO with 1983 (38th round) equal to 100 so as to assess the temporal changes in labour skill. Since the series required is from 1980-81, we have extrapolated it backwards from 1983.

4.3 Outstanding Issues

The third phase of this project aims to perform some robustness checks and bring out policy implications from the employment trends.

Appendix B: Employment Unemployment Survey (EUS) rounds of NSS
NSS Round Survey Period MID Period
38 1/83 to 12/83 01-Jul-83
43 7/87 to 6/88 01-Jan-88
45 7/89 to 6/90 01-Jan-90
46 7/90 to 6/91 01-Jan-91
47 7/91 to 12/91 01-Oct-91
48 1/92 to 12/92 01-Jul-92
49 1/93 to 6/93 01-Apr-93
50 7/93 to 6/94 01-Jan-94
51 7/94 to 6/95 01-Jan-95
52 7/95 to 6/96 01-Jan-96
53 1/97 to 12/97 01-Jul-97
54 1/98 to 6/98 01-Apr-98
55 7/99 to 6/00 01-Jan-00
56 7/00 to 6/01 01-Jan-01
57 7/01 to 6/02 01-Jan-02
58 7/02 to 12/02 01-Oct-02
59 1/03 to 12/03 01-Jul-03
60 01/04 to 6/04 01-Apr-04
61 7/04 to 6/05 01-Jan-05
66 7/09 to 6/10 01-Jan -10
68 7/11 to 6/12 01-Jan-12
Note: Highlighted Rounds are major or Quinquennial Rounds of EUS and rest are annual rounds.

Appendix C: Definitions of Employment in NSSO employment & unemployment surveys

The surveys of NSSO on employment and unemployment (EUS) aim to measure the extent of ‘employment’ and ‘unemployment’ in quantitative terms disaggregated by various household and population characteristics following the three reference periods of (i) one year, (ii) one week, and (iii) each day of the week. Based on these three reference periods three different measures, termed as usual status, current weekly status, and the current daily status, are arrived at. While all these three approaches are used for collection of data on employment and unemployment in the quinquennial surveys, the first two approaches only are used for the purpose in the annual surveys.

Usual principal status: In NSS 27th round, the usual principal activity category of the persons was determined by considering the normal working pattern, i.e., the activity pursued by them over a long period in the past and which was likely to continue in the future. For the identification of the usual principal status of an individual based on the major time criterion, in NSS 27th, 32nd, 38th, 43rd rounds, a trichotomous classification of the population was followed, that is, a person was classified into one of the three broad groups ‘employed’, ‘unemployed’ and ‘out of labour force’ based on the major time criterion. From NSS 50th round onwards, the procedure was changed and the prescribed procedure was a two-stage dichotomous one which involved a classification into ‘labour force’ and ‘out labour force’ in the first stage, and thereafter, the labour force into ‘employed’ and ‘unemployed’ in the second stage.

Usual subsidiary status: In the usual status approach, besides principal status, information in respect of subsidiary economic status of an individual was collected in all employment and unemployment surveys. For deciding the subsidiary economic status of an individual, no minimum number of days of work during the last 365 days was mentioned prior to NSS 61st round. In NSS 61st round, a minimum of 30 days of work, among other things, during the last 365 days, was considered necessary for classification as usual subsidiary economic activity of an individual.

Current weekly status: It is important to note at the beginning that in the EUS of NSSO, a person is considered as worker if he/she has performed any economic activity at least for one hour on any day of the reference week and uses the priority criteria in assigning work activity status. This definition is consistent with the ILO convention and used by most of the countries in the world for their labour force surveys. In NSSO, prior to NSS 50th round and in all the annual surveys till NSS 59th round, data on employment and unemployment in the CWS approach was collected by putting a single-shot question ‘whether worked for at least one hour on any day during the last 7 days preceding the date of survey’. The information so collected was used to determine the CWS of the individuals. This procedure was criticized for being not able to identify the entire workforce, particularly among the women. It was then decided to derive the CWS of a person from the time disposition of the household members for the 7 days preceding the date of survey. The procedure was used for the first time in NSS 50th round. It is seen that the change in the method of determining the current weekly activity had resulted in increasing the WPR in current weekly status approach - more so for the females in both rural and urban areas than for males. The trend observed in NSS 50th round in respect of the WPR according to CWS suggested continuing with the procedure for data collection in CWS in NSS 55th and NSS 61st rounds.

Current Daily Status

Current Daily Status (CDS) rates are used for studying intensity of work. These are computed on the basis of the information on employment and unemployment recorded for the 14 half days of the reference week. The employment statuses during the seven days are recorded in terms of half or full intensities. An hour or more but less than four hours is taken as half intensity and four hours or more is taken as full intensity. An advantage of this approach was that it was based on more complete information; it embodied the time utilisation, and did not accord priority to labour force over outside the labour force or work over unemployment, except in marginal cases. A disadvantage was that it related to person-days, not persons. Hence it had to be used with some caution.

Box 1: The Heckman model

The Heckman model is formulated in terms of two equations: a selection equation – usually a Probit estimation (takes a value of 1 if a person is working, 0 otherwise) to explain the decision of whether to participate in the labour market and, a regression equation to explain days of actual labour market participation, observable only for those for whom the selection equation takes a value of 1.

Heckman provides consistent, asymptotically efficient estimates for all the parameters in such a model. In actual estimation, a likelihood ratio test of the independence of these equations testing for ρ = 0) with the corresponding chi-squared statistic is done.

This technique helps us overcome the problem of not being able to observe the wage for those who are not employed in the reference period. The function has been used to the earnings of casual and regular employees

  • The earnings have been regressed on the dummies of age, sex, education, location, marital status, social exclusion and industry

  • The identification factors used in the first stage are age, sex, marital status, and type of household / size of households

Chapter 5: Capital Input Series at the Industry Level

This chapter outlines the methodology employed to estimate capital services for the 27 industries in the India KLEMS database version 2015. Following an overview of the theoretical method developed by Jorgenson and Griliches (1967), and outlined in Jorgenson, Gollop and Fraumeni, (JGF, 1987), the Chapter discusses the specific empirical approaches we follow to implement these methods within the constraints of data availability for Indian industries.

5.1 Methodology

For the measurement of capital services we need capital stock estimates for detailed asset types and the shares of each of these assets in total capital remuneration. Using the Törnqvist approximation to the continuous Divisia index under the assumption of instantaneous adjustability of capital, aggregate capital services growth rate is derived as a weighted growth rate of individual capital assets, the weights being the compensation shares of each asset, i.e.

Since our measure of capital input takes account of asset heterogeneity, it was essential to obtain investment data by asset type. We distinguish between 3 different asset types – construction, transport equipment, machinery (includes ICT and non-ICT machinery).22 We exploit multiple sources of information for the construction of our database on capital services. This includes the National Accounts Statistics (NAS) that provide information on broad sectors of the economy, the Annual Survey of Industries (ASI) covering the organized manufacturing sector, the National Sample Survey Organizations (NSSO) rounds for unorganized manufacturing and input-output tables. Even though we use multiple sources of data, our final estimates are fully consistent with the aggregate data obtained from the NAS. In addition, our approach to capital measurement is consistent with international practices such as the EU KLEMS23, which ensures the possibility of international comparisons. In what follows we discuss the various sources of data for asset wise investment and the construction of the relevant variables, in detail.

5.2 Data and Sources

(a) Asset-wise investment for broad sectors of the economy

Industry-level estimates of capital input require detailed asset-by-industry investment matrices. NAS provides information on aggregate capital formation by industry of use for 9 broad sectors, which, nevertheless, was not sufficient for our purpose. Therefore, we have collected more detailed data on assets and industries from the CSO.24 This is the data underlying the published aggregate gross fixed capital formation by the broad industry groups, separately for public and private sectors. For those sectors for which the investment matrices were not available from CSO, we gather information from other sources (e.g. ASI for organized manufacturing and NSSO surveys for unorganized manufacturing) and benchmark it to the aggregate investment series from the National Accounts. Table 5.1 provides an overview of asset types available in NAS and their corresponding asset types used in our study.

Table 5.1 : Capital Asset Types in National Accounts Statistics and Corresponding Our Study Types
NAS Asset Types India KLEMS Asset Types
Public Sector
Buildings Construction
Other construction Construction
Transport Equipment25 Transport Equipment
Machinery & Equipment Machinery & Equipment
Software (1999-00 onwards) Machinery & Equipment**
Private Sector
Residential buildings Construction
Non-residential building Construction
Other construction Construction
Machinery & Equipment (incl. transport equipment) Machinery & Equipment (transport equipment is excluded later*)
Software (1999-00 onwards) Machinery & Equipment**
Note: * transport equipment was not separately available for private sector and therefore it was imputed and subtracted from machinery and equipment (See main text).
** Software is included in the machinery and equipment, as we are not distinguishing between ICT and non-ICT assets in this version.
Source: CSO, NAS Different Issues

Total investment in each asset category is calculated as the sum of private and public sector investment in each asset. Investment in transport equipment is not available separately for private sector. We tried several approaches to impute the private sector transport equipment data. The first was to use the share of transport equipment in non-departmental enterprises. More specifically, we apply the non-departmental enterprise transport equipment to machinery & equipment (including transport equipment) ratio to machinery & equipment in private sector for each industry to obtain industry wise transport equipment for private sector. We take non-departmental enterprise only, rather than the entire public sector, as it may be more realistic as it consists of public sector companies and statutory corporations, excluding administrative sector. However, the sum of industry estimates generated by this approach was not consistent with the reported aggregate private sector transport equipment. Therefore, we take a second step here, which is to use the industry distribution from this series and apply it to the published total private sector transport equipment data. The estimated transport equipment is then subtracted from each industry’s total machinery & transport equipment data, to obtain machinery in private sector as a residual. However, this approach generates many negative numbers in transport equipment in private sector, particularly in transport services. Therefore, we follow a third approach, which is what we finally use in the database. We first distribute the NAS total machinery in the private sector using the industry distribution of machinery and transport equipment. These estimates are then subtracted from each industry’s total machinery & transport equipment data to obtain the transport equipment investment in the private sector industries.

(b) Asset-wise investment for non-NAS sectors

NAS provides data only for 9 broad sectors, while we have 27 industries, which necessitated further splitting of some of the NAS sectors. This includes aggregate manufacturing (registered and unregistered separately) with 13 sub-sectors; other services into 4 sub-sectors; and real estate activities and business services into 2 sub-sectors. The manufacturing sector investment data was disaggregated into 13 subsectors at the 2 digit level of NIC 1998 using ASI and NSSO data, which will be discussed in detail subsequently. Investment series in service sector has been split into sub-sectors using two alternative approaches–value added shares, and capital/labour ratio in the higher aggregate industry. However, the final data used are based on value-added shares, as a sensitivity analysis did not show a significant difference between the two.

In order to split the aggregate capital formation in organized manufacturing sector into 13 study sectors, we use the Annual Survey of Industries. However, the published data does not provide any asset wise investment information; it consists of only the aggregate capital formation or the book value of fixed capital. Most studies in the past have measured gross investment as the difference between book value of asset in period t and in period t-1 and add depreciation in period t to that. This approach has the deficiency of comparing two different samples reported in two different years, where the number of firms/factories might be different. In particular, while using this approach at industry level, for detailed asset categories, it might generate massive negative investment.

We follow an alternative approach, following ASI’s definition of gross fixed capital formation (GFCF). ASI defines GFCF as actual additions (newly purchased, second hand and own construction) minus deductions plus depreciation adjustment for discarded assets during the year. This approach is based on a single year’s sample and helps to avoid potentially huge negative investment series, and is also consistent with published ASI GFCF series.

The yearly detailed volumes beginning 1964-65 were used to derive the gross fixed capital formation by asset type directly. For the years 1964-1978, the relevant data are obtained from published detailed volumes. For the period, 1983-84 to 2004-05 ASI has generated detailed tables from Block C of ASI schedule that contain data on fixed assets. Data for missing years are interpolated using the changes in investment using book value method. Table 5.2 provides an overview of the asset categories available in ASI, and the relevant asset categories in our study to which they are attributed. Though ASI provides investment in land, for reasons of NAS consistency we exclude it from our database.

Once investment in each of these assets and industries are generated using ASI data, we apply this industry-asset distribution to the published aggregate NAS GFCF series for organized manufacturing sector. It may also be noted that from 1960-61 to 1971-72, ASI data are for the census sector and from 1973-74 onwards they are for the factory sector. In order to make these two series comparable over years, we convert the data prior to 1972 to factory sector using the factory/census ratio in 1973. Thus, after these adjustments, we obtain investment data for 13 manufacturing sectors, by asset types, consistent with the NAS aggregate.

Table 5.2: Asset Types in ASI and India KLEMS
ASI Asset Types India KLEMS Asset Types
Land Excluded
Buildings Buildings and Construction
Plants & Machinery Machinery & Equipment
Transport Equipment Transport Equipment
Computer Equipment including Software (from 1998) Machinery & Equipment*
Pollution control equipment (from 2000) Machinery & Equipment
Note: * Computer equipment and software are included in the machinery and equipment, as we are not distinguishing between ICT and non-ICT assets in this version.
Source: CSO, NAS Different Issues

The data required for creating the gross investment series for the 13 sectors of the unorganized manufacturing sector are obtained from various rounds of NSSO surveys on unorganized manufacturing. We use 4 rounds of NSSO surveys that cover the period 1989-2006. These are 45th round (1989-90), 51st round (1994-94), 56th round (2000-01) and 62nd round (2005-06). Unit level data has been aggregated to 13 industries using the appropriate concordance tables. NSSO provides net addition to owned assets during the reference year within the block of fixed assets, and we use this as a measure of our investment. Asset classification in NSSO has changed over various rounds, and therefore, we have tried to match these with our classification as shown in Table 5.3. The investment series arrived at for four rounds were interpolated to obtain the annual time series of unorganized gross fixed capital formation by asset type. As in the case of registered sector, once the investment by asset types across industries are constructed, the asset-industry distribution is applied to the published NAS aggregate GFCF in unregistered manufacturing to obtain NAS consistent GFCF by asset type and industries.

Table 5.3 : Asset Categories in NSSO Rounds
45th Round
(1989-90)
NSSO sectors India KLEMS Asset Types
51st Round
(1994-95)
56th Round
(2000-01)
62nd Round
(2005-06)
Land Land     Excluded
  Building     Construction
    Land & Buildings Land & Buildings Construction (land is excluded)
  Other construction     Construction
Building & other construction       Construction
Plant & machinery Plant & machinery Plant & machinery Plant & machinery Machinery & Equipment
Transport Equipment Transport Equipments Transport equipment Transport equipment Transport Equipment
  Tools     Machinery & Equipment
  Other fixed assets     Machinery & Equipment
Tools & other fixed assets   Tools & other fixed assets Tools & other fixed assets Machinery & Equipment
      Software & hardware Machinery & Equipment*
Note: For 56th and 62nd rounds, land is separated from land & buildings using land/land & building ratio from 51st round. * Computer equipment and software are included in the machinery and equipment, as we are not distinguishing between ICT and non-ICT assets in this version.
Source: NSSO Rounds

(c) Investment Prices by Asset Types

In order to compute asset wise capital stock using PIM (equation 5.3) and rental price (equation 5.4), we require asset wise investment price deflators. Since CSO has provided us with investment data by industries and assets both in current and constant prices, we could derive the price deflators with base 2004-2005. These deflators are directly used for all the three asset categories we have.

(d) Initial Stock, Depreciation Rates and Rate of Return

As is evident from equations 5.1 to 5.4, our estimates of capital input require time-series data on asset wise capital stock. Capital stock has been constructed using perpetual inventory method (PIM), where the capital stock (S) is defined as a weighted sum of past investments with weights given by the relative efficiencies of capital goods at different ages, which requires data on current investment by asset types, investment prices by asset types and depreciation rate. Also, for the practical implementation of PIM to estimate asset wise capital stock, we require an estimate of initial benchmark stock (see Erumban, 2008b for an in-depth discussion on this issue). NAS provides estimates of net capital stock since 1950 for all the broad sectors in its Statement 17: Net Fixed Capital Stock by industry of use. We take the NAS estimate of real net capital stock in 1950 (in 1999-2000 prices) as our benchmark stock for all non-manufacturing sectors, and for manufacturing sectors the same is taken for the year 1964.26 However, since the NAS estimate is available only for broad sectors and for aggregate capital, we use our industry-asset distribution of GFCF in order to create net fixed capital stock estimates by asset type for all the 27 sectors.

NAS also provides detailed tables on assumed life of assets used for computing capital stock, for private units, administrative units as well as departmental and non-departmental units by asset types.27 We use these estimates of lifetime to derive appropriate depreciation rates for non-ICT assets, using a double declining balance rate. We assume 80 years of lifetime for buildings, 20 years for transport equipment, and 25 years for machinery and equipment. The final depreciation rates used in the study are given in Table 5.4 by asset type. Subsequently, we build our capital stock series by asset types for all the 27 industries using our GFCF series from 1950 (1964) onwards for the non-manufacturing (manufacturing) sectors.

Table 5.4 : Depreciation Rate by Asset Type Used in the Computation of Capital Input
Asset Type Depreciation Rate (%)
Building and Construction 2.5
Transport Equipment 10.0
Machinery 8.0
Note: Depreciation rates are derived using NAS lifetimes for each asset assuming a double declining balance rate.

Our measure of capital input is arrived using equation (5.1), for which we also require estimates of rental prices (see equation 5.4). Assuming that the flow of capital services is proportional to the capital stock at individual asset level, aggregate capital flows can be obtained using a translog quantity index by weighting growth in the stock of each asset by the average shares of each asset in the value of capital compensation, as in (5.1). The rate of return (i) in equation (5.4) represents the opportunity cost of capital, and can be measured either as internal (or ex-post) rate of return, or as an external (ex-ante) rate of return.28 This issue will be addressed in the further revisions of the data. The present version of the database uses an external rate of return, proxied by average of return on government securities and prime lending rate obtained from the Reserve Bank of India29. Therefore, we use a real rate, which is net of capital gain. Hence, the capital gain component in equation (5.4) is excluded while estimating rental price using external rate of return, obtaining

Where i* is the real rate of return, nominal interest rate adjusted for CPI inflation rate.

(e) Investment by assets and industries for years after 2013

CSO does not have data on investment by assets and industries that corresponds to the India KLEMS classifications, for years after 2012-2013. Therefore, we had to do some imputations to extend the capital stock and capital service estimates for 2013-2014 and 2014-2015. National accounts provides data on total gross fixed capital formation (GFCF) in two asset types, construction and total equipment (i.e. sum of transport equipment and machinery) for the aggregate economy. We use this data as the benchmark to impute sectoral investment by asset type as follows. First we split the total equipment investment into machinery and transport equipment as:

Ii,t = Si,2012 • IEQ,t

where Ii,t is the total economy investment in asset i (for i = 1,…,2, i.e. transport equipment and machinery) in year t (for t > 2012-2013) and Si,2013 is the share of asset i in total machinery and equipment investment in 2012-2013. This helps us obtain total economy investment in three asset types, machinery, transport equipment and construction separately. Subsequently these three asset types are distributed across industries as:

Ii,j,t = Vi,j,t • Ii,t

where Ii,j,t is the investment in asset i (i=1,…,3; construction, machinery and transport equipment), Vi,j,t is the share of industry j in total investment in asset i in year t. This is obtained as

Where Ii,j,2012 is the investment in asset i in industry j in 2012-2013, Yj,2012 is the gross value added in industry j in 2012-2013 and Yj,t is the gross value added in industry j in year t (for t > 2012-2013).

Chapter 6: Intermediate Input Series at the Industry Level

In this section we describe the basic approach we have used to derive the volume series of intermediate inputs namely – energy input (E), material input (M) and services input (S). This breakdown of intermediate inputs can be used for extending the growth accounting exercises, but also convey interesting information about changing pattern in intermediate consumption ( see e.g. JHS 2005, chapter 4)

6.1 Methodology

The methodology for measuring industry output, intermediate inputs and value added was developed by Jorgenson, Gallop & Fraumeni (1987) and extended by Jorgenson (1990 a). The cornerstone of this approach is a time series of input-output (IO) tables which gives the flows of all commodities in the economy, as well as payments to primary factors. Every commodity is accounted for, whether produced by a domestic source or imported, and every use is noted, whether purchased by an industry or by a final demand element. All payments to factors of production i.e. labour and capital is accounted for so that all income elements of GDP are included. The methodology of constructing time series on energy, material and services inputs for the European economy has been elucidated in Timmer et al. (2010, Chapter 3). Following a similar approach as explained in Jorgenson et al. (2005, Chapter 4) and Timmer et al. (2010, Chapter 3), the time series on intermediate inputs for the India KLEMS project have been constructed.

Definition of EMS: As in EU KLEMS, this study identifies three main categories of Intermediate inputs. They are classified as follows:

  1. Energy Input

  2. Material Input

  3. Service Input

Intermediate Inputs are broken down into energy, material and services, based on input-output transaction tables using a standard NIC product classification. The following five energy types (and products) have been classified as the Energy input.

  1. Coal & lignite

  2. Petroleum products

  3. Electricity; (for electricity used in the electricity sector, since there is a good amount of inter-firm sale and purchase of electricity, it has been treated as material rather than as energy)

  4. Natural gas

  5. Gas (LPG)

The following fourteen input items have been classified as the Service input

  1. Water supply

  2. Railway transport services

  3. Other transport services

  4. Storage & warehousing

  5. Communication

  6. Trade

  7. Hotels & restaurants

  8. Banking

  9. Insurance

  10. Ownership of dwellings

  11. Education & research

  12. Medical & health

  13. Other services

  14. Public administration

All other intermediate inputs barring the above mentioned nineteen inputs are classified as material input.

The key building block for constructing time series on intermediate inputs at current prices, as explained in Jorgenson et al. (2005, Chapter 4), is the input-output transaction tables, that is, the inter-industry transaction tables that provide a description of which industries produce each product and which industries use them. The input-output table gives the inter-industry transactions in value terms at factor cost presented in the form of commodity x industry matrix where the columns represent the industries and the rows as group of commodities, which are the principal products of the corresponding industries. Each row of the matrix shows in the relevant columns, the deliveries of the total output of the commodities to the different industries for intermediate consumption and final use. The entries read down industry columns give the commodity inputs of raw materials and services, which are used to produce outputs of particular industries. The column entries at the bottom of the table give net indirect taxes (NIT) (indirect taxes – subsidies) on the inputs and the primary inputs (income from use of labour and capital), i.e., Gross Value Added (GVA). As the IOTT is in the form of commodity x industry matrix, the row totals do not tally with the column totals. The difference between each column and the corresponding row totals is due to the inclusion of the secondary products, which appear particularly in the case of manufacturing industries. This is so because by-products are also manufactured by industries in addition to their main products. Thus, while determining the entries in the rows, a by-product of an industry is transferred to the sector (commodity row), whose principal product is the same as the by-product under reference. The columns, however, show the total of principal products and by-products of each industry. All the entries in the IOTT are at factor cost, i.e. excluding trade and transport charges and NIT.

The Input Flow Matrix at factor cost, published by CSO, for 1978 is a 60 x 60 matrix. The absorption matrices for 1983, 1989, 1993 and 1998 have 115 sectors. However a detailed 130 sector absorption (commodity x industry) matrix for the Indian economy has been published from 2003-04 onwards. The scheme of sector classification adopted in IOTT 2013-14, IOTT 2007-08 and IOTT 2003-04 vis-à-vis, IOTT 1983-84, IOTT 1989-90, IOTT 1993-94 and 1998-99 has undergone significant change with the disaggregation of some of the sectors, which have become significant in early 2000s.

  1. In the agriculture and allied activities, four sectors, namely, ‘oilseeds’, ‘fruits’, ‘vegetables’ and ‘poultry & eggs’ have been introduced as separate sectors.

  2. In the mining sectors the sector ‘crude petroleum, natural gas’ has been disaggregated into two separate sectors as ‘natural gas’ and crude petroleum’.

  3. The sector ‘office computing machines’ in the earlier IOTT has been eliminated.

  4. The sector ‘miscellaneous manufacturing’ in the earlier IOTT has been disaggregated into ‘medical, precision & optical instruments’, ‘gems & jewellery’, ‘aircraft & spacecraft’ and ‘miscellaneous manufacturing’.

  5. Similarly, ‘other transport services’ in the earlier IOTTs are further disaggregated into ‘land transport including via pipelines’, ‘water transport’, ‘air transport’ and ‘supporting and auxiliary transport activities’.

  6. Similarly sector ‘gas’ has been regrouped in the present IOTT by merging its gobar gas component in the ‘other livestock product’ and LPG component in ‘petroleum products’.

  7. Another disaggregation is done in the ‘other services’ sector by reorganizing this into separate sectors as ‘business services’, ‘computer related services’, ‘legal services’, ‘real estate service activities’, ‘renting of machinery & equipment’, ‘other community, social & personal services’ and ‘other services’.

6.2 Implementation Procedure

The methodology for computation of intermediate input series for 27 Industries from 1980-2014 at current and constant prices is explained in steps.

Step 1: Concordance is done between IOTT and study industries

  • The 60/115/130 IOTT industries are aggregated to form industries.

  • A concordance table between the classification used in our study and the input-output transaction table (1998 and 2003) has been prepared. This has been attached at the end (refer appendix table D).

Step 2: Obtaining estimates for Material, Energy and Service Inputs for 27 Industries, in benchmark years

  1. In IOTT, no intermediate input is being used in industry 24 – ‘public administration’. Consequently, the intermediate input series is being directly estimated for only 26 industries from 1980 to 2014. However we have used ‘net purchase of commodities and services’ of administrative department as total intermediate input. And using information about ‘government final consumption expenditure’ we distribute the total intermediate input into material, energy and services input.

  2. Value of energy inputs used

  3. Value of material inputs used

  4. Value of service input used

  5. Value of total intermediate inputs (summation of the above three)

Thus, for each of the benchmark year, estimates are obtained for material, energy and service inputs that has been used to produce gross output in the 27 different India KLEMS Industries.

Step 3: Projecting a time series (1980 to 2014) of proportions of Material, Energy and Service Inputs in Total Intermediate Inputs for each of the 27 industries

  • For the benchmark years i.e. 1983, 1989, 1993, 1998, 2003, 2007 and 2013 proportions of material inputs, energy inputs, and service inputs in total intermediate inputs are calculated.

  • Similar proportion for intervening years is obtained by linear interpolation of the benchmark proportions.

  • This gives a time series of proportions of material, energy and service inputs in total intermediate inputs for each year, from 1980 to 2014.

  • Thus using IOTT, the intermediate input vector has been projected for 27 study industries from 1980 to 2014

Step 4: Consistency with NAS

The projection of intermediate input vector, using IOTT in Step 3 needs to be consistent with the estimated output from NAS.

  • The Gross Value of Output and the Gross Value Added at current prices calculated from NAS is taken. The difference between GVO and GVA provides us the gap between value added and gross output for each year or in other words this reflects the Total Intermediate inputs from NAS (GVO-GVA)

  • The intermediate input vector that has been projected using IOTT in the step 3 will not tally with the above estimates of Total Intermediate inputs from NAS. Thus the projected input vector, has been proportionately adjusted to match the gap between value added and gross output obtained from NAS. This involves two steps:

1. For Benchmark years: Ratio of Total Intermediate inputs from NAS to that from IOTT is adjusted proportionately to the absolute value of Energy Inputs/Material Inputs/Service Inputs obtained from IOTT.

2. For Intervening Years: The interpolated proportions of energy inputs, material inputs and services inputs obtained from IOTT, is applied directly to the total intermediate inputs from NAS to get each inputs share. Two examples have been given below for the construction sector:

Adjustment A: For IOTT Benchmark Year 1998
Source Output/Input Values
(in Rs Crore)
 
National Account Statistics GVO 241873  
GVA 88784
Total Input from NAS (GAP) 153089
For Benchmark IOTT year: Absolute value of Inputs from Input-Output Transaction Table are available Material 73132
Energy 4308
Service 37399
Total Input from IOTT 114839
Ratio of Total Input from NAS to Total Input from IOTT Total Input from NAS/ Total Input from IOTT = 1.33
Adjusted Input reported Material = 1.33 x 73132 97490
Energy = 1.33 x 4308 5743
Service = 1.33 x 37399 49855
Total Input = 1.33 x 114839 153089
 
Adjustment B: For Non-Benchmark Year 1999
Source Output/Input Values
(in Rs Crore)
 
National Account Statistics GVO 279464  
GVA 102007
Gap 177457
For Non-Benchmark IOTT year: Interpolated Proportions of Inputs from Input-Output Transaction Table have been used Material 0.64
Energy 0.04
Service 0.32
Total Input 1
Adjusted Input reported Material = .64 x 177457 113081
Energy = .04 x 177457 7300
Service = .32 x 177457 57076
Total Input = 1 x 177457 177457

In the examples above, we can see that the total value of intermediate input exactly matches the gap between Gross output and Value added. Similar adjustments have been made to construct the input series for all the other 27 study industries from 1980-2014. For every benchmark year where IOTT is available adjustment ‘A’ has been done. For every non-benchmark year, where IOTT is not available and an intermediate input vector has been projected, adjustment ‘B’ has been done to generate the comprehensive time series of Intermediate inputs consistent with the official National Accounts.

Steps 1-4: This gives a time series of Material, Energy, and Service Inputs for 27 study Industries from 1980 to 2014 at current prices.

Steps 5 and 6 below, explain the methodology for computation of Intermediate Input Series for 27 study Industries from 1980-2014 at constant price. The approach followed here is to first form the aggregates of materials, energy and services at current price for each study industry from the benchmark Input-Output tables and then develop deflators of Materials, Energy and Service Inputs for each of the 27 study Industries separately.

Step 5: Constructing Deflators of Materials, Energy and Service Inputs for 27 study Industries separately

  • Deflators are obtained for each of the 115 commodity inputs (each row of the IO Matrix)

  • WPI for the period 1980 to 2014 is taken from Office of the Economic Adviser, Ministry of Commerce and Industry.

  • Best available Wholesale Price Index is applied to each commodity input in the IOTT.

  • In several cases, no proper WPI is available for the sector; hence the best among the available has been chosen.

  • In some cases, the right index has been formed from item level indices.

  • In some case, one index has been removed from a higher level aggregate to generate the right index.

  • For Electricity as an input entering into the production process of an industry, depending on the nature of economic activity, the right price of electricity has been chosen.

  • For Service Inputs, since WPI is not available hence implicit GDP deflators from NAS are used.

  • Deflators obtained for different IO sectors have been combined using weights. The weights are based on the column of the relevant study industry in the IO table. This is because; the entries read down industry columns give the commodity inputs of raw materials and services, which are used to produce outputs of particular industries. We have allowed for changing weights over time i.e. we have used different weights for different time periods. Two IOTT has been used for this purpose - 1989 and 2003. The price series based on 1989 table has been used from 1980 to 1993 and the 2003 table has been used for the price series for the period 1993 to 2014. Once the two series have been formed, these have been spliced. Thus, the IO tables have been used for obtaining the materials, energy and services series for each industry at current prices.

Step 6: Computing Time Series on Intermediate Input for 27 study Industries from 1980-2014, Constant prices

  • The deflators for material, energy and service inputs for each study industry have been used to deflate the current price intermediate input series to constant price.

Thus we have a time series of material, energy and service inputs for 27 study industries at constant prices.

6.3 Outstanding Issues

Firstly, Input-Output transaction tables are generally available on a five year interval period and this necessitates interpolation and assumption of constant shares in some cases to construct the entire time series of EMS from 1980 to 2014.

Secondly, unlike studies using detailed survey data, we have to assume that all buyers pay the same price for each commodity because there is no information about price divergences.

Thirdly, The estimated time series of Intermediate Inputs at constant price will not be consistent with the intermediate input of NAS at constant price i.e. the deflated value of intermediate input cannot match the gap between value added and gross output at constant price from NAS. This is because NAS uses a single deflation method to estimate Gross Value Added and Gross Output at constant price.

‘However, only for one sector – agriculture, the gross output and gross value added, estimated by NAS is double deflated. Therefore only for the agriculture sector the deflated value of intermediate input will exactly match the gap between value added and gross output at constant price.

Fourthly, there has been some confusion in the literature on the price concept to be used for intermediate inputs. It is generally acknowledged that the intermediate input weights should be measured from the user’s point of view, i.e. reflect the marginal cost paid by the user. Most studies maintain that purchaser’s price should be used. These prices include net taxes on commodities paid by the user and include margins on trade and transportation (see, for example OECD 2001). However, when trade and transportation services are included as separate intermediate inputs, margins paid on other products should also be allocated to these services. Ideally a distinction should be made between the intermediate product valued at purchaser’s price minus margins and the trade and transportation services valued at margins. This is the approach taken in Jorgenson, Gollop & Fraumeni (1987) and in Jorgenson et al. (2005). However, Timmer et al. (2010, Chapter 3) explains that for the EU KLEMS database, intermediate inputs have been valued at purchaser’s price owing to unavailability of necessary data. Because of the use of purchaser’s price concept the shares of services in intermediate inputs do not include trade and transportation margins. Similarly in practice for the database, the time series of Intermediate Input constructed is at purchaser’s price i.e. it implicitly takes into account the net indirect taxes. The distribution of this net indirect tax between material, energy and services has not been possible because of unavailability of a time series of tax matrix from 1980 to 2014.

Appendix D : Concordance table of study industries and IOTT industries
KLEMS Industry No. Industry Description Sector No. IOTT 2003 Sector description Sector No. IOTT 1998 Sector
1 Agriculture, 1 paddy 1 paddy
  Hunting, 2 wheat 2 wheat
  Forestry & 3 jowar 3 jowar
  Fishing 4 bajra 4 bajra
    5 maize 5 maize
    6 gram 6 gram
    7 pulses 7 pulses
    8 sugarcane 8 sugarcane
    9 groundnut 9 groundnut
    10 jute 10 jute
    11 other oil seed 11 cotton
    12 cotton 12 tea
    13 tea 13 coffee
    14 coffee 14 rubber
    15 rubber 15 coconut
    16 coconut 16 tobacco
    17 tobacco 17 other crops
    18 fruits    
    19 vegetables    
    20 other crops    
    21 milk and milk products 18 milk & milk products
    22 animal services (agricultural) 19 animal services (agricultural)
    23 polutry & eggs    
    24 other livestock products 20 other livestock products
    25 forestry and logging 21 forestry & logging
    26 fishing 22 fishing
2 Mining & 27 coal & lignite 23 coal & lignite
  Quarrying 28 natural gas 24 crude petroleum, natural gas
    29 crude petroleum    
    30 iron ore 25 iron ore
    31 manganese ore 26 manganese ore
    32 bauxite 27 bauxite
    33 copper ore 28 copper ore
    34 other metallic minerals 29 other metallic minerals
    35 limestone 30 limestone
    36 mica H mica
    37 other non-metallic minerals 32 other non-metallic minerals
3 Food 38 sugar 33 sugar
  Products, 39 khandsari, boora 34 khandsari, boora
  Beverages 40 hydrogenated oil (vanaspati) 35 hydrogenated oil (vanaspati)
  & Tobacco 41 edible oils other than vanaspati 36 edible oils other than vanaspati
    42 tea & coffee processing 37 tea & coffee processing
    43 miscellaneous food products 38 miscellaneous food products
    44 beverages 39 beverages
    45 tobacco products 40 tobacco products
4 Textiles, Textile 46 khadi, cotton textiles (handlooms) 41 khadi, cotton textiles (handlooms)
  Products, 47 cotton textiles 42 cotton textiles
  Leather & 48 woolen textiles 43 woolen textiles
  Footwear 49 silk textiles 44 silk textiles
    50 art silk, synthetic fibre textiles 45 art silk, synthetic fibre textiles
    51 jute, hemp, mesta textiles 46 jute, hemp, mesta textiles
    52 carpet weaving 47 carpet weaving
    53 readymade garments 48 readymade garments
    54 miscellaneous textile products 49 miscellaneous textile products
    59 leather footwear 54 leather footwear
    60 leather & leather products 55 leather & leather products
5 Wood & Products of Wood 56 wood & wood products 51 wood & wood products
6 Pulp, Paper, Paper 57 paper, paper prods. & newsprint 52 paper, paper prods. & newsprint
  Products, Printing & Publishing 58 printing & publishing 53 printing & publishing
7 Coke, Refined Petroleum 63 petroleum products 58 petroleum products
  Products & Nuclear Fuel 64 coal tar products 59 coal tar products
8 Chemicals 65 inorganic heavy chemicals 60 inorganic heavy chemicals
  & Chemical 66 organic heavy chemicals 61 organic heavy chemicals
  Products 67 fertilizers 62 fertilizers
    68 pesticides 63 pesticides
    69 paints, varnishes & lacquers 64 paints, varnishes & lacquers
    70 drugs & medicines 65 drugs & medicines
    71 soaps, cosmetics & glycerin 66 soaps, cosmetics & glycerin
    72 synthetic fibres, resin 67 synthetic fibres, resin
    73 other chemicals 68 other chemicals
9 Rubber & 61 rubber products 56 rubber products
  Plastic Products 62 plastic products 57 plastic products
10 Other Non- 74 structural clay products 69 structural clay products
  Metallic 75 cement 70 cement
  Mineral Products 76 other non-metallic mineral prods. 71 other non-metallic mineral prods.
11 Basic Metals & 77 iron, steel & ferroalloys 72 iron, steel & ferroalloys
  Fabricated 78 iron & steel casting & forging 73 iron & steel casting & forging
  Metal Products 79 iron & steel foundries 74 iron & steel foundries
    80 non-ferrous basic metals 75 non-ferrous basic metals
    81 hand tools, hardware 76 hand tools, hardware
    82 miscellaneous metal products 77 miscellaneous metal products
12 Machinery, 83 tractors & agri. implements 78 tractors & agri. implements
  n.e.c. 84 industrial machinery (F & T) 79 industrial machinery (F & T)
    85 industrial machinery (others) 80 industrial machinery (others)
    86 machine tools 81 machine tools
    87 other non-electrical machinery 82 office computing machines
        83 other non-electrical machinery
13 Electrical & 88 electrical industrial machinery 84 electrical industrial machinery
  Optical 89 electrical wires & cables 85 electrical wires & cables
  Equipment 90 batteries 86 batteries
    91 electrical appliances 87 electrical appliances
    92 communication equipments 88 communication equipments
    93 other electrical machinery 89 other electrical machinery
    94 electronic equipments (incl.TV) 90 electronic equipments (incl. TV)
    101 watches & clocks 97 watches & clocks
    102 medical, precision & optical instruments    
14 Transport 95 ships & boats 91 ships & boats
  Equipment 96 rail equipments 92 rail equipments
    97 motor vehicles 93 motor vehicles
    98 motorcycles & scooters 94 motorcycles & scooters
    99 bicycles, cycle-rickshaw 95 bicycles, cycle-rickshaw
    100 other transport equipments 96 other transport equipments
    104 aircraft & spacecraft    
15 Manufacturing, 55 furniture & fixtures-wooden 50 furniture & fixtures-wooden
  n.e.c.; recycling 103 gems & jewellery    
    105 miscellaneous manufacturing 98 miscellaneous manufacturing
16 Electricity, Gas & Water
Supply
107 electricity 100 electricity
  108 water supply 101 gas
      102 water supply
17 Construction 106 construction 99 construction
18 Trade 116 trade 107 trade
19 Hotels & Restaurants 117 hotels & restaurants 108 hotels & restaurants
20 Transport & 109 railway transport services 103 railway transport services
  Storage 110 land transport including via pipeline 104 other transport services
    111 water transport 105 storage & warehousing
    112 air transport    
    113 supporting & auxilary transport activities    
    114 storage & warehousing    
21 Post & Telecommunication 115 communication 106 communication
22 Financial Services 118 banking 109 banking
    119 insurance 110 insurance
23 Business Service 123 business services 114 other services
    124 computer & related activities    
    125 legal services    
    127 renting of machinery & equipment    
24 Public Administration & Defense 130 public administration 115 public administration
25 Education 121 education & research 112 education & research
26 Health & Social Work 122 medical & health 113 medical & health
27 Other Services 120 ownership of dwellings 111 ownership of dwellings
        114 other services
    126 real estate activities    
    128 other communication, social & personal services    
    129 other services    
Source: Input Output Transaction Table 1998, 2003.

Chapter 7: Factor Income Share Series at the Industry Level

The distribution of income between capital, labour and intermediate inputs, is an important element in growth accounting because income shares under conditions of competitive markets can be used to measure the contributions each factor makes towards output growth.

7.1 Methodology for Measuring Labour Income Share Series

Under the assumption of constant returns to scale with two factors of production i.e., labour and capital, the sum of the labour income share and capital income share is 1. The labour income share is defined as the ratio of labour income to GVA. Capital income share is accordingly obtained as one minus labour income share.

There are no published data on factor income shares in Indian economy at a detailed disaggregate level. National Accounts Statistics (NAS) of the CSO publishes the NDP series comprising of compensation of employees (CE), operating surplus (OS) and mixed income (MI) for the NAS industries. The income of the self-employed persons, i.e. mixed income (MI) is not separated into the labour component and capital component of the income. Therefore, to compute the labour income share out of value-added, one has to take the sum of the compensation of employees and that part of the mixed-income which are wages for labour.

The computation of labour income share for the 27 study industries involves two steps. First, estimates of CE, OS and MI have to be obtained for each of the 27 study industries from the NAS data which are available only for the NAS sectors (see Table 7.1). Second, the estimate of mixed-income has to be split into labour income and capital income for each industry for each year (except for those industries for which the reported mixed income is zero, for instance, public administration).

Table 7.1 : NAS Sectors and Corresponding Study Industries, for Computation of Labour Income Shares
NAS sectors for which factor income data are available Corresponding Study Industries
1. Agriculture, forestry & logging and fishing 1 Agriculture, hunting, forestry and fishing
2. Mining & quarrying 2 Mining and quarrying
3.1 Manufacturing-registered 3 Food products, beverages and tobacco
3.2 Manufacturing - unregistered 4 Textiles, textile products, leather and footwear
Both registered and unregistered manufacturing are split into 13 manufacturing industries (3 to 15) 5 Wood & products of wood
  6 Pulp, paper, paper products, printing & publishing
  7 Coke, refined petroleum products & nuclear fuel
  8 Chemicals & chemical products
  9 Rubber & plastic products
  10 Other non-metallic mineral products
  11 Basic metals & fabricated metal products
  12 Machinery, n.e.c..
  13 Electrical & optical equipment
  14 Transport equipment
  15 Manufacturing, n.e.c.; recycling
4. Electricity, gas & water supply 16 Electricity, gas & water supply
5. Construction 17 Construction
6.1 Trade 18 Trade
6.2 Hotels & restaurants 19 Hotels & restaurants
7.1 Railways 20 Transport & storage
7.2 Transport by other means    
7.3 storage    
7.4 Communication 21 Post & telecommunication
8.1 Banking & insurance 22 Financial intermediation
9.1 Public administration & defense 24 Public administration & defence; compulsory social security
9.2 +8.2 Other services plus 25 Education
Real Estates, ownership of dwelling & business services 26 Health & social work
  23 Business services
  27 Other services*
Note: *Study Industry ‘Other Services’ includes Real Estate Activities; Other Community, Social and Personal Services, Private Household with Employed Persons.

Basis data sources used for the computation of labour income share are NAS, ASI and unit level data of survey of unorganized manufacturing enterprises. These data sources are used to obtain estimates of CE, OS and MI for each of the 27 study industries. For splitting the labour and non-labour components out of the mixed-income of self-employed, the unit level data of NSS employment-unemployment survey are used along with the estimates of CE, OS and MI basically obtained from the NAS.

7.2 Implementation Procedure

a) Construction of Labour Income Share Series in Gross Value Added

The estimation of labour income share for the 27 study industries has been done in two steps, as discussed below.

Step 1: Estimation of CE, OS and MI for the 27 study Industries

For some industries under study, for instance (i) Agriculture, forestry & logging and fishing, (ii) Mining & Quarrying, (iii) Electricity, gas and water supply and (iv) Construction, the required data are readily available from NAS. For others, the estimates available in NAS have to be distributed across the study industries. In certain cases, the estimates of CE, OS and MI for a particular NAS sector have been distributed across constituent study industries proportionately in accordance with the gross value added in those industries. Estimate of factor incomes for ‘other services’ in NAS, for instance, has been split into estimates for (i) Education, (ii) Health and Social Work, and (iii) Other Community, Social and Personal Services including Renting of machinery and business services, and Private Household with Employed Persons.

NAS provides estimates of factor incomes for registered manufacturing and unregistered manufacturing, but not for individual manufacturing industries. The NAS estimates of factor incomes for registered manufacturing have to be split into various manufacturing industries considered in the study (13 in number) using ASI data. The reported CE in NAS for registered manufacturing has been distributed into those 13 industries in proportion to the reported ASI data on emoluments for various industries. In a similar way, using ASI data, the estimate of OS for registered manufacturing has been distributed. Emoluments are subtracted from gross value added for various industries yielding capital income. The share of different industries in aggregate capital income of organized manufacturing indicated by the ASI data is used to split the estimate of OS for registered manufacturing reported in the NAS.

The methodology applied for unregistered manufacturing is similar. The published results and unit level data of survey of unorganized manufacturing industries have been used for this purpose. The estimates of wage payments (to hired workers) in different industries have been used to split (proportionately) the estimate of CE in the NAS for aggregate unregistered manufacturing. The estimated wage payment is subtracted from the estimated value added to obtain an estimate of capital income and mixed income of the self-employed in various unorganized manufacturing industries. The estimate of MI provided in NAS for unregistered manufacturing has then been proportionately distributed across industries using the estimate of capital income and mixed income of the self-employed in various industries that could be formed on the basis of published results and unit level data of survey of unorganized manufacturing industries.

Unlike the ASI data for organized manufacturing, the data for unorganized manufacturing enterprises are available for only select years. The proportions mentioned above could therefore be computed only for those select years (data for five rounds have been used; these are for 45th round (1989-90), 51st round (1994-95), 56th round (2000-01), 62nd round (2005-06) and 67th round (2010-11)). It has accordingly been necessary to resort to interpolation/ extrapolation to obtain the relevant proportions for other years.

Step 2: Splitting of MI into Labour Income and Capital Income

As explained above, the income share of labour is computed as:

The derivation of the GVA series for different industries has been briefly explained in Chapter 2. The derivation of CE and MI series has been explained in step I above. Therefore, only the estimation method of ƞ needs to be described. The estimation of ƞ has been done with the help of NSS survey-based estimates of employment of different categories of workers (number of persons and days of work) and wage rates (which has been described briefly in chapter 4) coupled with estimates of MI, basically obtained from the NAS. Two approaches have been taken to get an estimate of ƞ, and the labour income share series for different industries finally adopted in the study makes use of an average of the estimates of ƞ obtained by the two approaches.

In the first approach, an estimate of labour income of self-employed workers has been made for each study industry for five years, 1983-84, 1987-88, 1993-94, 1999-00, 2004-05, 2009-10 and 2011-12 on the basis of the estimated number of self-employed, wage rate of self-employed and the number of days of work per week. The industry-wise estimates of number of self-employed, wage rate of self-employed and the number of days of work per week have been made from unit records of NSS employment-unemployment survey (major rounds), as explained in chapter 4 above.

The estimates of the number of self-employed, wage rate of self-employed and the number of days of work per week provide an estimate of the annual labour income of self-employed workers which is divided by the mixed-income of self-employed (derived from NAS) to get an estimate of ƞ. For five industries, the ratio in question has been computed and applied. For the other 22 industries, the ratio in question has been computed after clubbing the industries into 11 industry groups.30 In the latter case, a common ratio computed for group of industries has then been applied to constituent industries. The list of industries or industry groups for which ƞ has been estimated is given in table 7.2.

In the second approach, the NSS data are used to compute the following ratio: the ratio of labour income of self-employed workers to the labour income of regular and casual workers. Let this be denoted by θ. Then, the estimate of CE provided in the NAS is multiplied by θ to obtain an estimate of the labour income component out of the MI reported in the NAS. The labour component of MI divided by total MI gives an estimate of ƞ. In case the estimated labour component of MI exceeds the estimate of MI, the estimate of ƞ has been taken as unity.

Examining the estimates obtained by the first approach, it was found that the estimated labour income share out of mixed-income varied significantly among the estimates for the seven years for which the ratio in question has been estimated.

The estimates of ƞ obtained by the second approach has the problem that in a number of cases, the estimated labour component of MI exceeds the estimate of MI given in the NAS, and therefore ƞ is taken as one.

The method finally adopted is as follows: (a) The average value of ƞ has been computed for each industry or industry group by taking the estimates for the years 1983-84, 1987-88, 1993-94, 1999-00, 2004-05, 2009-10 and 2011-12. This has been done separately for the estimates based on approach-1 and those based on approach-2. (b) The estimates of ƞ obtained for each industry or industry group by the two approaches have then been averaged. (c) Having obtained an estimate of ƞ, equation 6.1 given above has been applied to compute the labour income share.

Table 7.2 : Industries and Groups for which ƞ (proportion of labour income out of mixed-income) has been estimated
Industry/Industry Group Study Industries
Agriculture, Hunting, Forestry and Fishing Agriculture, Hunting, Forestry and Fishing
Mining and Quarrying Mining and Quarrying
Food products, beverages, tobacco, textiles, leather products Food Products, Beverages and Tobacco
  Textiles, Textile Products, Leather and Footwear
Wood, wood products, paper and printing Wood and Products of Wood
  Pulp, Paper, Paper Products, Printing and Publishing
Petroleum products, chemical products, rubber and plastic products Coke, Refined Petroleum Products and Nuclear Fuel
  Chemicals and Chemical Products
  Rubber and Plastic Products
Other Non-Metallic Mineral Products Other Non-Metallic Mineral Products
Metals, metal products, machinery and transport equipment Basic Metals and Fabricated Metal Products
  Machinery, n.e.c.
  Electrical and Optical Equipment
  Transport Equipment
Manufacturing, n.e.c.; recycling Manufacturing, n.e.c.; recycling
Electricity, Gas and Water Supply Electricity, Gas and Water Supply
Construction Construction
Trade, hotels, restaurants Trade
  Hotels and Restaurants
Transport, storage and communication Transport and Storage
  Post and Telecommunication
Public administration & defence Public Administration and Defence; Compulsory Social Security
Education and health Education
  Health and Social Work
Other services including financial services, real estates, business services Financial Intermediation
Business Services
Other Services
Source: National Account Statistics (NAS) reports..

b) Construction of Factor Income Share Series in Gross output

The income share of labour, capital and intermediate inputs in Gross output has been computed using the following steps:

  • First the individual shares of intermediate inputs that is energy, material and services in Gross output is calculated.

  • The labour income and capital income out of Gross Value Added are further distributed into income share of labour in gross output and income share of capital in gross output.

  • Thus, we get the share of labour, capital, material, energy and services in output.

  • For Agriculture Sector, land is taken as an input. First income share of intermediate inputs in gross output is calculated. Then the non-labour income (out of value added) in Agriculture is distributed equally between land and capital inputs to derive weights.

7.3. Outstanding Issues

The splitting of unorganized sector factor incomes into individual industries has been done using unorganized survey results. The proportions computed for 1983-84 has been applied for the period 1980-81 to 1983-84. While there were surveys of unorganized manufacturing enterprises in 1978-79 and 1984-85, the survey results have not been used for estimation of factor incomes in different industries of the unorganized manufacturing sector. An attempt will be made to use survey data for the years 1978-79 and 1984-85 rather than applying the proportions computed for 1989-90 to factor income data for earlier years.

In case of KLEMS data series, we have used CE, OS and MI data from NAS. As NAS provides information on CE and OS for aggregate registered manufacturing. So we distribute it among 13 registered manufacturing industries using ASI information. Similarly for unorganized manufacturing we have information on CE and MI. so we distribute it using NSSO information. And then add up the registered and unregistered portion to get overall manufacturing CE, OS and MI. In case of organized and unorganized manufacturing data set, we use Emoluments/GVA from ASI as labour income share for organized manufacturing industries. And Emoluments/GVA for NDME+DME as labour income share for unorganized manufacturing.

Chapter 8: Growth Accounting Methodology

This chapter deals with the methodology of measurement of total factor productivity (TFP) growth for individual industries in the KLEMS framework and the aggregation from industry-level productivity measures to measures for broad sectors and the economy as a whole. The methodology of analysis of sources of gross output growth at the individual industry level and sources of GVA (Gross Value Added) or GDP growth at the broad sector level and economy level will also be presented in this chapter

8.1 Methodology for Measuring Productivity Growth at the Industry level

The production function

Our measurement of TFP growth for different industries of the Indian economy is based on a gross output production function for each industry j:

Y = f(L(L1,…Ln), K(K1…Km), E(E1….Es), M(M1 …Mu), S(S1 … Sv), T) (8.1)

Y is industry gross output, L is labour input, K is capital input and E, M and S are intermediate inputs-namely energy, material and services and T is an indicator of technology for industry j. All variables are indexed by time (t subscript is suppressed).

There are several things to note about the production function- (1) all variables are aggregates of many components that have been discussed in the earlier report/chapters; (2) we assume that the industry production function is separable in these aggregates; (3) time (indicator of technology) enters the production function symmetrically and directly with inputs. An important feature of the gross output approach is the explicit role of intermediate inputs. In our study, we have considered three intermediate inputs - energy, material and services and this is important as we may find that intermediate inputs are the primary component of some industries outputs.31 Failure to quantify intermediate inputs leads us to miss both the role of key industries that produce intermediate inputs and the importance of intermediate inputs for the industries that use them.

In order to estimate the production function at constant prices, the industry level price data is used for output, capital, labour and intermediate inputs, e.g., PYj; PLj, PKj; PEj. PMj, PSj. We assume that all industries face the same input price. The industry price of an input varies across industries due to compositional effects as industries expend different shares of their investment on each type of asset. The same is true for all inputs.

8.2 Methodology for Aggregation across Industries

In the analysis presented in the above section, gross value of output (GVO) is taken as the measure of output of an industry and TFP growth was estimated using the gross output function framework in which capital, labour, materials, energy and services are taken as five inputs (in the case of agriculture, land was included among inputs). The Törnqvist index is applied to estimate TFP growth for each year during 1980-81 to 2014-15, which yielded an index of TFP for each industry for that period, permitting estimation of trend growth rate in TFP for the period under study (1980-81 to 2014-15).

The method of estimation of TFP growth for individual industries described in section 7.1 cannot be readily applied to a higher level of aggregation. The main problem is that gross value of output cannot be added across industries to generate a measure of output at a higher level of aggregation, say for the economy or of any of the broad sectors. It becomes necessary therefore to consider appropriate methods of aggregation across industries consistent with the gross output function specification of technology at the individual industry level. It is needless to say that one has to use the concept of value added to define an appropriate measure of output at the economy or broad sector level, but even here there are important issues of aggregation, i.e. how value added in different industries should be combined. A very useful discussion of the issues involved is found in Jorgenson et al. (2005).

There are three approaches to estimating TFP growth at an aggregate level. This is discussed in detail in Jorgenson et al. (2005). The first approach is called aggregate production function approach. This approach assumes the existence of an aggregate production function (say, at the level of the economy or at the level of manufacturing or services sector). An essential condition is that the production function be separable in primary inputs. Let the production function for a particular industry be defined as:

Y =f(X, K, L, T), (8.8)

where Y denotes gross output, X intermediate input (in turn a combination of materials, energy and services), K capital input, L labour input and T time (representing technology). Then, the concept of value-added requires the existence of a value-added function which in turn requires that the above production function be separable in K, L and T, i.e. the production function should take the following form:

Y =g(X, V(K, L, T)). (8.9)

In this equation, V (.) is the value-added function. V denotes value added.

Besides the condition of separability of the production function described above, a number of highly restrictive assumptions have to be made for the aggregate production function approach. These include: (a) the value-added function is the same across all industries up to a scalar multiple, (b) the functions that aggregate heterogeneous types of labour and capital must be identical in all industries, and (c) each specific type of capital and labour receives the same price in all industries. With these assumptions made, real value added at the aggregate level becomes a simple addition of real value added in individual industries. In notation,

where Vi is value added in the i'th industry and V is the aggregate value added. Given aggregate value added and somewhat similarly defined aggregate capital and labour input, TFP growth at the aggregate level can be computed.

The second approach to aggregation is the aggregate production possibility frontier approach. It also needs the separability condition described in equations 7.8 and 7.9 above, as in the case of the aggregate production function approach. The main difference between the aggregate production function approach and the aggregate production possibility frontier approach is that the latter relaxes the assumption that all industries must face the same value-added function. Thus, the price of value added is no longer assumed to be the same across industries. The implication is that the aggregate value added from the aggregate production possibility frontier is given by the Törnqvist index of the industry value added as:

In this equation, wi is the share of industry i in aggregate value added in nominal terms. Thus, defining PV,i as the price of value added in industry i and Vi as the real value added in industry i, the share in question may be defined as:

and the two-period average is defined as:

Since each industry is subject to a production function separable in capital, labour and technology, as defined in equation7.9, real gross output, real value of intermediate inputs and real value added of industry i in a particular year t should satisfy the following relationship:

In this equation, uV and uX are the shares of value added and intermediate inputs in the gross value of output in nominal terms. Given data on growth in gross output and growth in intermediate input of a particular industry, the above equation yields the growth in real value added of that industry.

TFP growth from the aggregate production possibility frontier may be defined as follows:

In this equation K and L are aggregate capital input and labour input respectively, and VK and VL are value shares (or income shares) of capital and labour respectively. If one maintains the assumption that each specific type of capital and labour input has the same price in all industries, then each type of capital (labour) can be summed across industries and then a Törnqvist index can be constructed to yield aggregate capital (labour) input. Alternatively, different types of capital input can be combined using a Törnqvist index into total capital input used in an industry and then industry level growth in capital input can be combined with the help of a Törnqvist index to obtain growth in capital input at the aggregate level. In a similar manner, the growth in aggregate labour input can be computed.

The third approach to measuring the TFP index at a higher level of aggregation is to apply direct aggregation to industry level estimates. This maintains the industry level production accounts as the fundamental building block and begins with industry level sources of growth. Of the three approaches described here, this is the least restrictive in terms of the assumptions involved. The following equation expresses the relationship between aggregate value-added growth and the growth in capital and labour inputs and TFP in individual industries:

In this equation, vK is the value share of capital in gross output, VL is the value share of labour in gross output, VV is the share of value added in gross output, and Wi is the share of industry i in aggregate value added in nominal terms. The bars indicate that the average of two periods, t and t-1, are to be taken. The last term in equation 7.16 is:

This is the Domar aggregation of TFP growth rates at individual industry level. Note that it is weighted average of industry level TFP growth rates. But, the weights add up to more than one.

8.3 Implementation Procedure

The data constructed for gross value added and gross output, labour input, capital inputs, intermediate inputs and factor income shares (Chapters 2, 3,4,5,6 and 7 respectively), are used to estimate TFPG during the period 1980 to 2014. Labour input is measured using total person worked (see, Chapter 4 for the detailed discussion). The series on growth rate in capital services is taken from Chapter 5.

Appendix Table1: Population, WFPR and Persons Employed in Different EUS Rounds
Rounds→ 38th 43rd 50th 55th 61st 66th 68th
Year→ 1983 1987-88 1993-94 1999-2000 2004-05 2009-10 2011-12
Population(million)↓              
Rural Male 281.19 305.557 339.642 374.71 400.718 423.886 431.722
Rural Female 266.87 287.811 319.508 354.02 379.102 400.852 409.834
Urban Male 91.20 104.297 124.007 145.99 164.852 183.831 199.785
Urban Female 80.39 92.6781 111.391 131.244 148.332 165.502 186.101
WFPR (UPSS, per 100 persons)              
Rural Male 54.72 53.89 55.30 53.06 54.62 54.70 54.34
Rural Female 33.97 32.31 32.79 29.88 32.70 26.08 24.84
Urban Male 51.21 50.65 52.11 51.76 54.86 54.28 54.64
Urban Female 15.11 15.22 15.46 13.90 16.60 13.77 14.69
Persons Employed(million)              
Rural Male 15386 16466 18782 19882 21887 23187 23460
Rural Female 9066 9299 10477 10578 12397 10454 10180
Urban Male 4670 5283 6462 7556 9044 9978 10916
Urban Female 1215 1411 1722 1824 2462 2279 2734
Total Employed 30337 32459 37443 39841 45790 45898 47290
Source: 1. Employment Unemployment Survey, different issues.
2. Midyear Population Estimates have been obtained from Visaria, (1996) for 1977-78 (Jan) and 1987-88 (Jan); Sundaram, (2007) for 1983 (July), 1993-94 (Jan), 1999-00 (Jan) and 2004-05 (Jan)] and from NSSO (2010) for Jan 2010 and Jan 2012

1 Kanhaiya Singh and M. R. Saluja (2016), Input-Output Table for India, 2013-14, Working Paper no WP-111, National Council of Applied Economic Research, New Delhi.

2 Kanhaiya Singh and M. R. Saluja (2016), Input-Output Table for India, 2013-14, Working Paper no WP-111, National Council of Applied Economic Research, New Delhi

3 Timmer, M.P, Mahony, M. and van Ark, B.(2007). The EU KLEMS growth and productivity accounts: an overview. Mimeo University of Groningen & University of Brinmingham,

4 Readers can refer to India KLEMS Data Manual Version 2013 for the data set released by RBI on its website in June 2014.

5 From both aggregated 9 NAS sectors Gross Domestic Product by economic activity statement along with the disaggregated statements of these 9 NAS sectors.

6 It uses NAS Series 2004-05 for more recent years.

7 Kanhaiya Singh and M.R. Saluja (2016), Input-Output Table for India, 2013-14, Working Paper no WP-111, National Council of Applied Economic Research, New Delhi

8 The principal components of Manufacturing n.e.c. are Manufacturing of jewellery and related articles, Manufacture of musical instruments, Manufacture of sports goods, Manufacture of games and toys and other manufacturing.

9 See Himanshu (2011) for a discussion on many issues associated with the NSSO employment surveys.

10 The coverage and the sample size of thin rounds is different from major rounds.

11 Problems in using UPSS are: The UPSS seeks to place as many persons as possible under the category of employed by assigning priority to work; no single long-term activity status for many as they move between statuses over a long period of one year, and Usual status requires a recall over a whole year of what the person did, which is not easy for those who take whatever work opportunities they can find over the year or have prolonged spells out of the labour force.

12 In EU-KLEMS changes in labour composition has been measured by including employment class, gender, age and education (Timmer,op cit; p64) and only 3 categories of education defined as high skilled, medium skilled and low skilled have been taken. This concept of labour composition is refereed as ‘labor quality’ by Jorgenson. It is recognized (Timmer; op cit; p84) that the categorization may lead to biases in the aggregate composition adjustment if employment trends and wage share differ within categories. These education categories generally correspond to- up to Primary education, above Primary to Hr Secondary education and above Hr Sec or College education. Due to data limitations in India we have measured changes in labour composition only by changes in education profile of labour; hence named it labour education index. Therefore it became necessary to have a more detailed classification of education to capture the changes in skill composition of labour in India. For comparison, we estimated the changes in labour composition based on three education categories also and found that for the total economy the annual trend growth in labour education index is 1.16 percent as compared to 1.25 percent based on five education categories.

13 This procedure has been advocated by NSSO itself and has been consistently adopted by almost all researchers.

14 A very lucid description of the same is given by Sivasubramonian (2004).

15 Appendix Table 1 provides the details about the Census Population, WFPR by UPSS, and persons employed in each of the EUS rounds used in the study.

16 Aggregate input is measured as a translog index of its individual components. Then the corresponding index is a Törnqvist volume index (see Jorgenson, Gollop and Fraumeni 1987). For all aggregation of quantities we use the Törnqvist quantity index, which is a discrete time approximation to a Divisia index. This aggregation approach uses annual moving weights based on averages of adjacent points in time. The advantage of the Törnqvist index is that it belongs to the preferred class of superlative indices (Diewert 1976). Moreover, it exactly replicates a translog model which is highly flexible, that is, a model where the aggregate is a linear and quadratic function of the components and time.

17 Although census population is available only decennially, we used the interpolated population figures for the mid-year survey periods [Visaria, (1996) for 1977-78 (Jan) and 1987-88 (Jan); Sundaram, (2007) for 1983 (July), 1993-94 (Jan), 1999-00 (Jan) and 2004-05 (Jan)] and from NSSO (2010) for Jan 2010 and Jan 2012.

18 In EU KLEMS (Timmer, op cit; p 67) it is assumed that the earnings is equal to the earnings of ‘regular' employees.

19 The details of the function can be obtained from the Stata software and from Appendix.

20 Asset prices are used in the aggregation of capital stock. However, it is the price of the capital service that must be used in aggregating capital services (see Jorgenson and Griliches, 1967; Diewert, 1980) as it is the services delivered by capital goods that are used in the production process,. Jorgenson and Griliches (1967) have shown that these two prices are related; the asset prices are the discounted value of all future capital services. They are not proportional though, as there are differences in replacement rates and capital gains among different capital assets.

22 This version of the database does not make a distinction between ICT and non-ICT assets, as the industry level data on ICT assets are weak. An attempt to estimate aggregate economy level ICT capital can be found in Erumban and Das (2015).

23 See O’ Mahony and Timmer (2009) for a description of EU KLEMS database

24 This data is not publicly available. However, CSO has been kind to compile this data for the India-KLEMS project.

25 In some years transport equipment was provided as part of the machinery and equipment, categorized as ‘tools, transport equipment and other fixed assets’. In such cases, we use transport/tools, transport and other fixed asset ratio in the nearest year to separate transport equipment.

26 This choice is driven by the fact that the first year of availability of ASI data is 1964-65.

27 National Accounts Statistics-Sources and Methods, Chapter 26, CSO (2007)

28 We do not intend to delve into the controversies over the use of internal vs. external rate of return in the context of productivity measurement. Rather, given that this is the first version of our data, we use the external rate and in a later stage, we will also use internal rates. See Erumban (2008a and b) for a discussion on these issues.

29 Reserve Bank of India, Handbook of Indian Statistics, Annual volumes.

30 The estimation is done at group level rather than individual industries on the consideration that the group level estimates will be more reliable.

31 Consider, the semi conductor (SC) industry, which is a key input to the computer hardware industry. Much of the output is invisible at the aggregate level because semi conductor products are intermediate inputs to other industries rather than deliverables to final demand- consumption and investment goods. Moreover, SC plays a role in the improvements in quality and performance of other products like-computers, communication equipments and scientific instruments. Failure to account for them leads us to miss the role of key industries that produce intermediate inputs and importance of intermediate inputs for the industries that use them. [Jorgenson, Ho and Stiroh (2005), Productivity, volume 3].

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