In this paper, we deal with a general equilibrium problem where a bimap f: A x B subset of or equal to X x Y --> 2(Z) is involved. This problem contains the scalar equilibrium problem as a very special case. The general equilibrium is considered via the properties of the map G: B --> 2(A) naturally associated to the problem. The main result shows that, to have solutions on every convex subsets B-1 of B, localized via a map T: B --> 2(A), a necessary and sufficient condition is the KKM property of the map G with respect to T. The assumptions require that T satisfies a regularity condition with respect to G, and it is proved that this condition is quite sharp, providing a suitable counterexample
Bianchi, M., Pini, R. (2002). A result on localization of equilibria. JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 115(2), 335-343 [10.1023/A:1020888205598].
A result on localization of equilibria
PINI, RITA
2002
Abstract
In this paper, we deal with a general equilibrium problem where a bimap f: A x B subset of or equal to X x Y --> 2(Z) is involved. This problem contains the scalar equilibrium problem as a very special case. The general equilibrium is considered via the properties of the map G: B --> 2(A) naturally associated to the problem. The main result shows that, to have solutions on every convex subsets B-1 of B, localized via a map T: B --> 2(A), a necessary and sufficient condition is the KKM property of the map G with respect to T. The assumptions require that T satisfies a regularity condition with respect to G, and it is proved that this condition is quite sharp, providing a suitable counterexample
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