Measuring Efficiency in Imperfectly Competitive Markets: An Example of Rational Inefficiency

The standard assumption in the efficiency literature, that firms attempt to produce on the production frontier, may not hold in markets that are not perfectly competitive, where the production decisions of all firms will determine the market price, i.e., an increase in a firm’s output level leads to a lower market clearing price and potentially lower profits. This paper models both the production possibility set and the inverse demand function, and identifies a Nash equilibrium and improvement targets which may not be on the production frontier when some inputs or outputs are fixed. This behavior is referred to as rational inefficiency because the firm reduces its productivity levels in order to increase profits. For a general short-run multiple input/output production process, which allows a firm to adjust its output levels and variable input levels, the existence and the uniqueness of the Nash equilibrium is proven. The estimation of a production frontier extends standard market analysis by allowing benchmark performance to be identified. On-line supplementary materials include all proofs and two additional results; when changes in quantity have a significant influence on price and all input and outputs are adjustable, we observe more benchmark production plans on the increasing returns to scale portion of the frontier. Additionally, a direction for improvement toward the economic efficient production plan is estimated, thus providing a solution to the direction selection issue in a directional distance analysis.

[1]  A. Goldberger STRUCTURAL EQUATION METHODS IN THE SOCIAL SCIENCES , 1972 .

[2]  M. Shubik,et al.  Market structure and behavior , 1982 .

[3]  Renato De Leone,et al.  Data Envelopment Analysis , 2009, Encyclopedia of Optimization.

[4]  F. Facchinei,et al.  Finite-Dimensional Variational Inequalities and Complementarity Problems , 2003 .

[5]  J. Nash Equilibrium Points in N-Person Games. , 1950, Proceedings of the National Academy of Sciences of the United States of America.

[6]  Shlomo Maital,et al.  The organizational foundations of X-inefficiency: A game-theoretic interpretation of Argyris' model of organizational learning , 1994 .

[7]  CENERAL EQUILIBRIU,et al.  GENERAL EQUILIBRIUM THEORY WITH IMPERFECT COMPETITION' , 1990 .

[8]  S. Afriat Efficiency Estimation of Production Function , 1972 .

[9]  G. Stigler Production and Distribution in the Short Run , 1939, Journal of Political Economy.

[10]  A. Marshall Principles of Economics , .

[11]  Jens Leth Hougaard,et al.  Rational Inefficiencies , 2003 .

[12]  Kaoru Tone,et al.  Data Envelopment Analysis , 1996 .

[13]  J. Goodman Note on Existence and Uniqueness of Equilibrium Points for Concave N-Person Games , 1965 .

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

[15]  Marie-Laure Bougnol,et al.  Anchor points in DEA , 2009, Eur. J. Oper. Res..

[16]  Rolf Färe,et al.  Measuring the technical efficiency of production , 1978 .

[17]  Amr Farahat,et al.  A nonnegative extension of the affine demand function and equilibrium analysis for multiproduct price competition , 2010, Oper. Res. Lett..

[18]  Fernando Bernstein,et al.  Comparative statics, strategic complements and substitutes in oligopolies , 2004 .

[19]  Patrick T. Harker,et al.  A variational inequality approach for the determination of oligopolistic market equilibrium , 1984, Math. Program..

[20]  Andrew L. Johnson,et al.  Proactive data envelopment analysis: Effective production and capacity expansion in stochastic environments , 2014, Eur. J. Oper. Res..

[21]  Augustin M. Cournot Cournot, Antoine Augustin: Recherches sur les principes mathématiques de la théorie des richesses , 2019, Die 100 wichtigsten Werke der Ökonomie.

[22]  S. Karamardian Generalized complementarity problem , 1970 .

[23]  A.A.R. Madhavi,et al.  Efficiency Estimation of Production Functions , 2013 .

[24]  D. Primont,et al.  Multi-Output Production and Duality: Theory and Applications , 1994 .

[25]  Hanif D. Sherali,et al.  A mathematical programming approach for determining oligopolistic market equilibrium , 1982, Math. Program..

[26]  Chad Syverson,et al.  Reallocation, Firm Turnover, and Efficiency: Selection on Productivity or Profitability? , 2005 .

[27]  Timo Kuosmanen,et al.  Non-parametric production analysis in non-competitive environments , 2002, International Journal of Production Economics.

[28]  A. U.S.,et al.  Measuring the efficiency of decision making units , 2003 .

[29]  Patrick T. Harker,et al.  Projections Onto Efficient Frontiers: Theoretical and Computational Extensions to DEA , 1999 .

[30]  Hurvey Leibenstein Allocative efficiency vs. X-Efficiency , 1966 .

[31]  G. Stigler The Xistence of X-Efficiency , 1976 .

[32]  Harold O. Fried,et al.  The Measurement of Productive Efficiency and Productivity Growth , 2008 .

[33]  K. Arrow,et al.  EXISTENCE OF AN EQUILIBRIUM FOR A COMPETITIVE ECONOMY , 1954 .

[34]  Gongyun Zhao,et al.  Complementarity Demand Functions and Pricing Models for Multi-product Markets , 2009 .