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Social Indicators Research

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22.08.2015

Revisiting Worst-Case DEA for Composite Indicators

verfasst von: Stergios Athanassoglou

Erschienen in: Social Indicators Research | Ausgabe 3/2016

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Abstract

Composite indicators are becoming increasingly influential tools of environmental assessment and advocacy. Nonetheless, their use is controversial as they often rely on ad-hoc and theoretically problematic assumptions regarding normalization, aggregation, and weighting. Nonparametric data envelopment analysis (DEA) methods, originating in the production-economics literature, have been proposed as a means of addressing these concerns. These methods dispense with contentious normalization and weighting techniques by focusing on a measure of best-case relative performance. Recently, the standard DEA model for composite indicators was extended to account for worst-case analysis by Zhou et al. (Ecol Econ 62(2):291–297, 2007) [hereafter, ZAP]. In this note we argue that, while valid and interesting in its own right, the measure adopted by ZAP may not capture, in a mathematical as well as practical sense, the notion of worst-case relative performance. By contrast, we focus on the strict worst-case analogue of standard DEA for composite indicators and show how it leads to tractable optimization problems. Finally, we compare the two methodologies using data from ZAP’s Sustainable Energy Index case study, demonstrating that they occasionally lead to divergent results.

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It is worth noting that there exist other nonparametric frameworks that impose less restrictive assumptions on aggregation. This increased generality usually introduces ambiguity to the index results. For instance, in the context of multidimensional welfare measurement, Anderson et al. (2011) mpose solely monotonicity and quasiconcavity on the aggregation function and derive upper and lower bounds on index scores, not precise values and rankings.

An additional advantage of the proposed approach is that it results in worst-case DEA scores that share a similar 0–1 scale to that of best-case DEA scores. Thus, there is no need for potentially contentious normalization procedures when taking the aforementioned convex combinations of best- and worst-case DEA scores.

The reader may refer to Example 1 in Ebert and Welsch (2004) for a concrete demonstration of this fact in the context of an index measuring eutrophication.

All computations in this section were performed in MATLAB. Details and programs available upon request.

That is, it lists the values of $CI^*_a(1/2)$ for all $a \in {\mathcal {A}}$, where

$$\begin{aligned} CI^{*}_{a_j}(\lambda ) \equiv \lambda \frac{f^*_{a_j}-\min _{a \in {\mathcal {A}}} f^*_{a}}{\max _{a \in {\mathcal {A}}}f^*_{a}-\min _{a \in {\mathcal {A}}} f^*_{a}} +(1 -\lambda ) \frac{g^{*}_{a_j}-\min _{a \in {\mathcal {A}}} g^{*}_{a}}{\max _{a \in {\mathcal {A}}}g^{*}_{a}-\min _{a \in {\mathcal {A}}} g^{*}_{a}}. \end{aligned}$$

(15)

Note that, unlike ZAP, the above normalization is not necessary because the $g^*_{a_j}$ measures defined in Eq. (10) are already scaled to range between 0 and 1. Nonetheless, we still adopt it to maximize comparability of the two sets of results.

Note that both the numerator and denominator of the inner minimization of Eq. (14) are affine non-zero functions.

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Titel: Revisiting Worst-Case DEA for Composite Indicators
verfasst von: Stergios Athanassoglou
Publikationsdatum: 22.08.2015
Verlag: Springer Netherlands
Erschienen in: Social Indicators Research / Ausgabe 3/2016
Print ISSN: 0303-8300
Elektronische ISSN: 1573-0921
DOI: https://doi.org/10.1007/s11205-015-1078-3

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