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An N-dimensional version of Scarf's example

✍ Scribed by Junichi Minagawa

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
280 KB
Volume
9
Category
Article
ISSN
1468-1218

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✦ Synopsis

This paper presents a unification of the contributions of Scarf [Some examples of global instability of competitive equilibrium, Int. Econ. Rev. 1 (1960) 157-172] and Gale [A note on global instability of competitive equilibrium, Nav. Res. Logist. Q. 10 (1963) 81-87] by means of a single class of utility functions. The unification extends Scarf's three-commodity, three-consumer economy to an n-commodity, n-consumer economy. We find that the stability of the extended economy depends on whether the law of demand for exchange economies, i.e., downward sloping excess demand, holds or not. Moreover, it is seen that there is a transition from instability to stability as substitution effect increases or as the desire of each consumer for his own commodity decreases.

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In this paper we generalize the linear Kostant Convexity Theorem to Lie algebras of bounded linear operators on a Hilbert space: If t is a Cartan subspace of one of the hermitian real forms h(H), ho(I c ), hsp(I a ), p t is the projection on t, U the corresponding unitary group and W the correspondi