Van den Brink, RenéNúñez, Marina (Núñez Oliva)Robles Jiménez, Francisco Javier2021-07-142024-07-312021-070022-0531https://hdl.handle.net/2445/179058In two-sided assignment markets with transferable utility, we first introduce two weak monotonicity properties that are compatible with stability. We show that for a fixed population, the sellers-optimal (respectively the buyers-optimal) stable rules are the only stable rules that satisfy object-valuation antimonotonicity (respectively buyer-valuation monotonicity). Essential in these properties is that, after a change in valuations, monotonicity is required only for buyers that stay matched with the same seller. Using Owen's derived consistency, the two optimal rules are characterized among all allocation rules for two-sided assignment markets with a variable population, without explicitly requiring stability.27 p.application/pdfengcc-by-nc-nd (c) Elsevier, 2021https://creativecommons.org/licenses/by-nc-nd/4.0/Economia matemàticaMercat financerEquilibri (Economia)Mathematical economicsFinancial marketEquilibrium (Economics)info:eu-repo/semantics/article7131442021-07-14info:eu-repo/semantics/openAccess