Quality of local equilibria in discrete exchange economies

Abstract

This paper defines the notion of a local equilibrium of quality (r , s), 0 ≤ r , s, in a discrete exchange economy: a partial allocation and item prices that guarantee certain stability properties parametrized by the numbers r and s. The quality ( r , s ) measures the fit between the allocation and the prices: the larger r and s the closer the fit. For r , s ≤ 1 this notion provides a graceful degradation for the conditional equilibria of [10] which are exactly the local equilibria of quality ( 1 , 1 ). For 1 < r , s the local equilibria of quality ( r , s ) are more stable than conditional equilibria. Any local equilibrium of quality ( r , s ) provides, without any assumption on the type of the agents' valuations, an allocation whose value is at least r s 1 + r s the optimal fractional allocation. In any economy in which all agents' valuations are a-submodular, i.e., exhibit complementarity bounded by a \: ≥ \: 1, there is a local equilibrium of quality ( 1 a , 1a ). In such an economy any greedy allocation provides a local equilibrium of quality ( 1 , 1a ) . Walrasian equilibria are not amenable to such graceful degradation.