Héctor Hermida Rivera (QSMS) will present “Self-Equivalent Voting Rules” on March 2nd, 2026, at 10:30 AM, in room QA323.
Abstract:
In this paper, I introduce a novel stability axiom for stochastic voting rules, called self-equivalence, by which a society considering whether to replace its voting rule using itself will choose not to do so. I then show that under the unrestricted strict preference domain, the unique voting rule satisfying the democratic principles of anonymity, optimality, monotonicity, and neutrality as well as the stability principle of self-equivalence must assign to every voter equal probability of being a dictator (i.e., uniform random dictatorship). Thus, any society that desires stability and adheres to the aforementioned democratic principles is bound to either employ the uniform random dictatorship or decide whether to change its voting rule using a voting rule other than itself.