1. Andrea Brandolini Banca d’Italia, Department for Structural Economic Analysis 2012 ISFOL Conference “Recognizing the Multiple Dimensions of Poverty: How Research Can Support Local Policies” Rome, 22 -23 May 2012 Strategies of multidimensional measurement

2. World Bank, World Development Report 2000/2001: Attacking Poverty “This report accepts the now traditional view of poverty … as encompassing not only material deprivation (measured by an appropriate concept of income or consumption), but also low achievements in education and health. … This report also broadens the notion of poverty to include vulnerability and exposure to risk – and voicelessness and powerlessness” (italics added) Background

3. Multidimensionality in poverty research Source: author’s search of "exact phrase" in Google Scholar, 21 May 2012. Multidimensional poverty Multidimensional deprivation

4. Alkire & Foster “Counting and multidimensional poverty measurement”, Journal of Public Economics, 2011 “Multidimensional poverty has captured the attention of researchers and policymakers alike due, in part, to the compelling conceptual writings of Amartya Sen and the unprecedented availability of relevant data.” Background

5. Europe 2020 strategy Five headline targets for member states’ policies: “Reduction of poverty by aiming to lift at least 20 million people out of the risk of poverty or social exclusion” Risk of poverty or social exclusion → multidimensional Poor population comprises people … … either living in households with very low work intensity (where adults work less than 20% of total work potential) … or at-risk-of-poverty after social transfers (equivalised income below 60 % of national median) … or severely materially deprived (at least 4 out of 9 deprivations owing to lack of resources)

6. Multidimensionality in practice Empirical strategies –Do we want a single number? –Weighting –Functional form Health and income deprivation in France, Germany and Italy, 2000 Conclusions Outline

7. Multidimensionality has intuitive appeal Problems arise in transforming intuition into hard data Not every indicator needs to be appropriate E.g. “proportion of persons meeting friends or relatives less than once a month or never” (Eurostat 2000; Townsend 1979) Infrequent meetings with friends may signal … weak social ties but also … preference for quietness … or passion for internet Multidimensionality in practice

8.  Multidimensional measurement without theory may be misleading What is needed? –Identification of relevant dimensions –Construction of corresponding indicators –Understanding of indicator metrics –Empirical strategies, i.e. tools to deal with multidimensionality Multidimensionality in practice

9. Empirical Strategies for Multiple Dimensions Source: author’s elaboration based on Brandolini e D’Alessio 1998. Item-by-item analysis Supplementation strategy Comprehensive analysis Non-aggregative strategies Aggregative strategies Vector dominance Sequential dominance Equivalence scales Well-being indicator Multivariate techniques Multidimensional poverty indices Counting approach Social welfare approach

10. Alternative strategies differ for extent of manipulation of raw data  the heavier the structure imposed on data, the closer to complete cardinal measure Focus on aggregate measures, i.e. multidimensional index or well-being indicator (both single number but … )  Do we want a single number?  Weighting  Functional form Empirical strategies

11. Pros: communicational advantage  single complete ranking more likely to capture newspaper headlines and people’s imagination than multidimensional scorecards (‘Eye-catching property’, Streeten on HDI) Cons: 1. different metrics 2. informational loss 3. imposed trade-offs (complements/substitutes) Do we want a single number?

12. Different weighting structures reflect different views Sen  ‘ranges’ of weights rather than single set Alternatives: –Equal weighting. Lack of information about ‘consensus’ view. But no discrimination. –Data-based weighting. Frequency-based or multivariate techniques. Caution in entrusting a mathematical algorithm with a normative task –Market prices. Existing for some attributes only, inappropriate for well-being comparisons Weighting

13. (Old) HDI measured average achievement in human developments in a country as where:Y = GDP per capitaL = life expectancy at birth A = adult literacyG = gross school enrolment Upper/lower bars = max/min Replace prefixed minima and maxima and simplify Functional form

14. Iso-HDI Contours Source: author’s elaboration on data drawn from UNDP (2005). All countries shown in the figure have similar values of the education index, comprised between 0.93 and 0.96. 1 year = $2,658 in Japan = $166 in Kyrgyzstan

15. Functional form

16. Intersection poor H 1,2 Union poor H 1 +H 2 –H 1,2 Non poor Union vs. intersection Atkinson’s counting index: A = 2 - κ (H 1 +H 2 ) + (1–2 1-κ )H 1,2 κ = 0union κ ↑more weight on multiple deprivations κ → ∞intersection

17. Iso-poverty contours for Bourguignon-Chakravarty measure If θ → ∞ substitutability tends to 0, contours = rectangular curves If θ=α=1 attributes are perfect substitutes and convex part becomes straight line The higher  relative to , the more the two attributes are substitutes

18. European Community Household Panel (ECHP) All persons aged 16 or more Two indicators: –Health status: measured on a scale from 5 (very good) to 1 (very bad) and based on respondent’s self-perception Health-poor = bad or very bad health –Household equivalent income Income-poor = equivalent income < median Health and income deprivation in France, Germany and Italy, 2000

19. Health and income deprivation (percentage values) Source: author’ elaboration on ECHP data, Wave 8. Health- poor Income- poor Health- poor and income- poor Health- poor or income- poor France8.015.22.021.2 Germany19.011.23.127.1 Italy11.519.52.728.3

20. Bourguignon-Chakravarty index - Different parameter values Source: author’ elaboration on ECHP data, Wave 8. Logarithmic scale for horizontal axes. Italy Germany France Health and income deprivation in France, Germany and Italy, 2000

21. Bourguignon-Chakravarty index - Different weighting Source: author’ elaboration on ECHP data, Wave 8. from health only to income only Italy Germany France Health and income deprivation in France, Germany and Italy, 2000

22. Health-poor: score=1,2 Consistent with cutoff at any value between 2 and 3 –cutoff = 3 (used above)possible values=1/3,2/3 –cutoff = 2+  possible values=0,1/2 Contribution of health lower with 2+  –Germany0.0110 instead of 0.0232 –France0.0134 instead of 0.0195 Agreement on identification of poor health status does not lead to unambiguous definition of poverty cutoff and then consistent with different values of index  Serious shortcoming, as general problem for any indicator in discrete space Bourguignon-Chakravarty index

23. Atkinson’s counting index Source: author’s elaboration on ECHP data, Wave 8. Italy Germany France Health and income deprivation in France, Germany and Italy, 2000 A = 2 - κ (H 1 +H 2 ) + (1–2 1-κ )H 1,2 κ = 0union κ ↑more weight on multiple deprivations κ → ∞intersection

24. Measurement of poverty and inequality in a multidimensional space poses new problems relative to measurement in unidimensional spaces Understanding sensitivity of results to underlying hypotheses is crucial part of analysis But there is value added! Conclusion

25. Thank you for your attention!