Differentiability of equilibria for linear exchange economies

Differentiability of equilibria for linear exchange economies

0.00 Avg rating0 Votes
Article ID: iaor2002257
Country: United States
Volume: 109
Issue: 2
Start Page Number: 265
End Page Number: 288
Publication Date: May 2001
Journal: Journal of Optimization Theory and Applications
Authors: , ,
Abstract:

The purpose of this paper is to study the differentiability properties of equilibrium prices and allocations in a linear exchange economy when the initial endowments and utility vectors vary. We characterize an open dense subset of full measure of the initial endowment and utility vector space on which the equilibrium price vector is a real analytic function, hence infinitely differentiable function. We provide an explicit formula to compute the equilibrium price and allocation around a point where it is known. We also show that the equilibrium price is a locally Lipschitzian mapping on the whole space. Finally, using the notion of the Clarke generalized gradient, we prove that linear exchange economies satisfy a property of gross substitution.

Reviews

Required fields are marked *. Your email address will not be published.