Add to ORKGFor the many-to-one matching model in which firms have substitutable and quota q-separable preferences over subsets of workers we show that the workers-optimal stable mechanism is group strategy-proof for the workers. In order to prove this result, we also show that under this domain of preferences (which contains the domain of responsive preferences of the college admissions problem) the workers-optimal stable matching is weakly Pareto optimal for the workers and the Blocking Lemma holds as well. We exhibit an example showing that none of these three results remain true if the preferences of firms are substitutable but not quota q-separable
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many to-many matching markets. We sho...
We study strategy-profness in many-to many matching markets. We prove that when firms have acyclica...
For the many-to-one matching model in which firms have substitutable and quota q-separable preferenc...
We are grateful to Flip Klijn, Howard Petith, William Thomson, a referee and an associate editor of ...
Abstract: For the many-to-one matching model in which firms have substi-tutable and quota q−separabl...
The Blocking Lemma identifies a particular blocking pair for each non-stable and individually ration...
We are grateful to Flip Klijn, Howard Petith, William Thomson, a referee and an associate editor of ...
Abstract: The Blocking Lemma identi\u85es a particular blocking pair for each non-stable and individ...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We are grateful to Flip Klijn, Howard Petith, William Thomson, an associate editor, and two referees...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many to-many matching markets. We sho...
We study strategy-profness in many-to many matching markets. We prove that when firms have acyclica...
For the many-to-one matching model in which firms have substitutable and quota q-separable preferenc...
We are grateful to Flip Klijn, Howard Petith, William Thomson, a referee and an associate editor of ...
Abstract: For the many-to-one matching model in which firms have substi-tutable and quota q−separabl...
The Blocking Lemma identifies a particular blocking pair for each non-stable and individually ration...
We are grateful to Flip Klijn, Howard Petith, William Thomson, a referee and an associate editor of ...
Abstract: The Blocking Lemma identi\u85es a particular blocking pair for each non-stable and individ...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We are grateful to Flip Klijn, Howard Petith, William Thomson, an associate editor, and two referees...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many-to-many matching markets under r...
We study the existence of group strategy-proof stable rules in many to-many matching markets. We sho...
We study strategy-profness in many-to many matching markets. We prove that when firms have acyclica...