Directional distances and their robust versions: Computational and testing issues

Directional distance functions provide very flexible tools for investigating the performance of Decision Making Units (DMUs). Their flexibility relies on their ability to handle undesirable outputs and to account for non-discretionary inputs and/or outputs by fixing zero values in some elements of the directional vector. Simar and Vanhems (2012) and Simar et al. (2012) indicate how the statistical properties of Farrell-Debreu type of radial efficiency measures can be transferred to directional distances. Moreover, robust versions of these distances are also available, for conditional and unconditional measures. BE˜adin et al. (2012) have shown how conditional radial distances are useful to investigate the effect of environmental factors on the production process. In this paper we develop the operational aspects for computing conditional and unconditional directional distances and their robust versions, in particular when some of the elements of the directional vector are fixed at zero. After that, we show how the approach of BE˜adin et al. (2012) can be adapted in a directional distance framework, including bandwidth selection and two-stage regression of conditional efficiency scores. Finally, we suggest a procedure, based on bootstrap techniques, for testing the significance of environmental factors on directional efficiency scores. The procedure is illustrated through simulated and real data.

[1]  George Emm. Halkos,et al.  A conditional directional distance function approach for measuring regional environmental efficiency: Evidence from UK regions , 2013, Eur. J. Oper. Res..

[2]  Paul W. Wilson,et al.  Asymptotic Properties of Some Non-Parametric Hyperbolic Efficiency Estimators , 2011 .

[3]  Rolf Färe,et al.  New directions : efficiency and productivity , 2004 .

[4]  Qi Li,et al.  Nonparametric Econometrics: Theory and Practice , 2006 .

[5]  P. W. Wilson,et al.  Estimation and inference in two-stage, semi-parametric models of production processes , 2007 .

[6]  R. Färe,et al.  Profit, Directional Distance Functions, and Nerlovian Efficiency , 1998 .

[7]  R. Färe,et al.  Directional output distance functions: endogenous directions based on exogenous normalization constraints , 2013 .

[8]  Léopold Simar,et al.  Testing whether two-stage estimation is meaningful in non-parametric models of production , 2010 .

[9]  J. Florens,et al.  Nonparametric frontier estimation: a robust approach , 2002 .

[10]  R. Färe,et al.  Efficiency and Productivity: Malmquist and More , 2008 .

[11]  Léopold Simar,et al.  Nonparametric conditional efficiency measures: asymptotic properties , 2010, Ann. Oper. Res..

[12]  Léopold Simar,et al.  Optimal bandwidth selection for conditional efficiency measures: A data-driven approach , 2010, Eur. J. Oper. Res..

[13]  P. W. Wilson,et al.  Estimation and Inference in Nonparametric Frontier Models: Recent Developments and Perspectives , 2013 .

[14]  R. Färe,et al.  Benefit and Distance Functions , 1996 .

[15]  Léopold Simar,et al.  How to measure the impact of environmental factors in a nonparametric production model , 2012, Eur. J. Oper. Res..

[16]  Léopold Simar,et al.  Explaining inefficiency in nonparametric production models: the state of the art , 2014, Ann. Oper. Res..

[17]  M. Farrell The Measurement of Productive Efficiency , 1957 .

[18]  Léopold Simar,et al.  Introducing Environmental Variables in Nonparametric Frontier Models: a Probabilistic Approach , 2005 .

[19]  Léopold Simar,et al.  Statistical inference for DEA estimators of directional distances , 2012, Eur. J. Oper. Res..

[20]  Léopold Simar,et al.  WHEN BIAS KILLS THE VARIANCE: CENTRAL LIMIT THEOREMS FOR DEA AND FDH EFFICIENCY SCORES , 2014, Econometric Theory.

[21]  Jeffrey S. Racine,et al.  Cross-Validation and the Estimation of Conditional Probability Densities , 2004 .

[22]  Léopold Simar,et al.  Effect of FDI and Time on Catching Up: New Insights from a Conditional Nonparametric Frontier Analysis , 2015 .

[23]  R. Färe,et al.  The measurement of efficiency of production , 1985 .

[24]  L. Simar,et al.  Nonparametric efficiency analysis: a multivariate conditional quantile approach , 2007 .

[25]  Wolfgang Härdle,et al.  Applied Nonparametric Regression , 1991 .

[26]  Léopold Simar,et al.  Advanced Robust and Nonparametric Methods in Efficiency Analysis: Methodology and Applications , 2007 .

[27]  R. Shepherd Theory of cost and production functions , 1970 .

[28]  P. W. Wilson,et al.  Two-stage DEA: caveat emptor , 2011 .

[29]  Léopold Simar,et al.  Probabilistic characterization of directional distances and their robust versions , 2012 .

[30]  G. Debreu The Coefficient of Resource Utilization , 1951 .

[31]  Léopold Simar,et al.  What is the impact of scale and specialization on the research efficiency of European universities , 2013 .

[32]  Jeffrey S. Racine,et al.  Consistent Significance Testing for Nonparametric Regression , 1997 .

[33]  Rajiv D. Banker,et al.  Efficiency Analysis for Exogenously Fixed Inputs and Outputs , 1986, Oper. Res..

[34]  Jeffrey S. Racine,et al.  Nonparametric Econometrics: The np Package , 2008 .