Abstract
This paper studies the problem of assigning a set of indivisible objects to a set of agents when monetary transfers are not allowed and agents reveal only ordinal preferences, but random assignments are possible. We offer two characterizations of the probabilistic serial mechanism, which assigns lotteries over objects. We show that it is the only mechanism that satisfies non-wastefulness and ordinal fairness, and the only mechanism that satisfies sd-efficiency, sd-envy-freeness, and weak invariance or weak truncation robustness (where “sd” stands for first-order stochastic dominance).
Keywords
Random assignment; Probabilistic serial; Ordinal fairness; Sd-efficiency; Sd-envy-freeness; Weak invariance; Weak truncation robustness;
JEL codes
- C71: Cooperative Games
- C78: Bargaining Theory • Matching Theory
- D71: Social Choice • Clubs • Committees • Associations
- D78: Positive Analysis of Policy Formulation and Implementation
Reference
Tadashi Hashimoto, Daisuke Hirata, Onur Kesten, Morimitsu Kurino, and Utku Ünver, “Two axiomatic approaches to the probabilistic serial mechanism”, January 2014.
See also
Published in
January 2014