Set-Rationalizable Choice and Self-Stability

Abstract

A common assumption in modern microeconomic theory is that choice should be rationalizable via a binary preference relation, which Sen71a showed to be equivalent to two consistency conditions, namely α (contraction) and γ (expansion). Within the context of social choice, however, rationalizability and similar notions of consistency have proved to be highly problematic, as witnessed by a range of impossibility results, among which Arrow's is the most prominent. Since choice functions select sets of alternatives rather than single alternatives, we propose to rationalize choice functions by preference relations over sets (set-rationalizability). We also introduce two consistency conditions, α and γ, which are defined in analogy to α and γ, and find that a choice function is set-rationalizable if and only if it satisfies α. Moreover, a choice function satisfies α and γ if and only if it is self-stable, a new concept based on earlier work by Dutt88a. The class of self-stable social choice functions contains a number of appealing Condorcet extensions such as the minimal covering set and the essential set.