A Partial Order on Preference Profiles

Abstract

We propose a theoretical framework under which preference profiles can be meaningfully compared. Specifically, given a finite set of feasible allocations and a preference profile, we first define a ranking vector of an allocation as the vector of all individuals' rankings of this allocation. We then define a partial order on preference profiles and write "P ≥ P'", if there exists an onto mapping from the Pareto frontier of P' onto the Pareto frontier of P, such that the ranking vector of any Pareto efficient allocation x under P' is weakly dominated by the ranking vector of the image allocation (x) under P. We provide a characterization of the maximal and minimal elements under the partial order. In particular, we illustrate how an individualistic form of social preferences can be maximal in a specific setting. We also discuss how the framework can be further generalized to incorporate additional economic ingredients.