Market equilibrium via the excess demand function

We consider the problem of computing market equilibria and show three results. (i) For exchange economies satisfying weak gross substitutability we analyze a simple discrete version of tâtonnement, and prove that it converges to an approximate equilibrium in polynomial time. This is the first polynomial-time approximation scheme based on a simple atonnement process. It was only recently shown, using vastly more sophisticated techniques, that an approximate equilibrium for this class of economies is computable in polynomial time. (ii) For Fisher's model, we extend the frontier of tractability by developing a polynomial-time algorithm that applies well beyond the homothetic case and the gross substitutes case. (iii) For production economies, we obtain the first polynomial-time algorithms for computing an approximate equilibrium when the consumers' side of the economy satisfies weak gross substitutability and the producers' side is restricted to positive production.

[1]  A. Smithies The Stability of Competitive Equilibrium , 1942 .

[2]  P. Samuelson,et al.  Foundations of Economic Analysis. , 1948 .

[3]  L. Walras Elements of Pure Economics , 1954 .

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

[5]  F. Hahn Gross Substitutes and the Dynamic Stability of General Equilibrium , 1958 .

[6]  L. Hurwicz,et al.  ON THE STABILITY OF THE COMPETITIVE EQUILIBRIUM, I1 , 1958 .

[7]  T. Negishi A NOTE ON THE STABILITY OF AN ECONOMY WHERE ALL GOODS ARE GROSS SUBSTITUTES , 1958 .

[8]  L. Hurwicz,et al.  COMPETITIVE STABILITY UNDER WEAK GROSS SUBSTITUTABILITY: THE EUCLIDEAN DISTANCE APPROACH , 1960 .

[9]  L. Hurwicz,et al.  SOME REMARKS ON THE EQUILIBRIA OF ECONOMIC SYSTEMS , 1960 .

[10]  E. Eisenberg Aggregation of Utility Functions , 1961 .

[11]  T. Negishi THE STABILITY OF A COMPETITIVE ECONOMY: A SURVEY ARTICLE , 1962 .

[12]  V. Polterovich Economic Equilibrium and the Optimum , 1973 .

[13]  Stability , 1973 .

[14]  K. Arrow,et al.  Handbook of Mathematical Economics , 1983 .

[15]  D. Newman,et al.  Complexity of circumscribed and inscribed ellipsoid methods for solving equilibrium economical models , 1992 .

[16]  M. Primak A converging algorithm for a linear exchange model , 1993 .

[17]  A. Mas-Colell,et al.  Microeconomic Theory , 1995 .

[18]  Ilya Segal,et al.  Solutions manual for Microeconomic theory : Mas-Colell, Whinston and Green , 1997 .

[19]  R. Bausor Elements of general equilibrium analysis. , 1999 .

[20]  Nikhil R. Devanur,et al.  Market equilibrium via a primal-dual-type algorithm , 2002, The 43rd Annual IEEE Symposium on Foundations of Computer Science, 2002. Proceedings..

[21]  Amin Saberi,et al.  Approximating Market Equilibria , 2003, RANDOM-APPROX.

[22]  Kamal Jain,et al.  A Polynomial Time Algorithm for Computing the Arrow-Debreu Market Equilibrium for Linear Utilities , 2004, FOCS.

[23]  Rahul Garg,et al.  Auction algorithms for market equilibrium , 2004, STOC '04.

[24]  Sriram V. Pemmaraju,et al.  Algorithms Column: The Computation of Market Equilibria , 2004 .

[25]  Sriram V. Pemmaraju,et al.  The computation of market equilibria , 2004, SIGA.

[26]  Ning Chen,et al.  Fisher Equilibrium Price with a Class of Concave Utility Functions , 2004, ESA.

[27]  Kamal Jain,et al.  A polynomial time algorithm for computing an Arrow-Debreu market equilibrium for linear utilities , 2004, 45th Annual IEEE Symposium on Foundations of Computer Science.

[28]  Bruno Codenotti,et al.  Efficient Computation of Equilibrium Prices for Markets with Leontief Utilities , 2004, ICALP.

[29]  Sriram V. Pemmaraju,et al.  On the polynomial time computation of equilibria for certain exchange economies , 2005, SODA '05.

[30]  Vijay V. Vazirani,et al.  Market equilibria for homothetic, quasi-concave utilities and economies of scale in production , 2005, SODA '05.