In the Hospitals/Residents (HR) problem, agents are partitioned into hospitals and residents. Each agent wishes to be matched to an agent in the other set and has a strict preference over these potential matches. A matching is stable if there are no blocking pairs, i.e., no pair of agents that prefer each other to their assigned matches. Such a situation is undesirable as it could lead to a deviation in which the blocking pair form a private arrangement outside the matching. This however assumes that the blocking pair have social ties or communication channels to facilitate the deviation. Relaxing the stability definition to take account of the potential lack of social ties between agents can yield larger stable matchings. In this paper, ...
AbstractThe hospitals/residents (HR) problem is a many-to-one generalization of the stable marriage ...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
The Hospitals/Residents problem with Couples (HRC) is a generalisation of the classical Hospitals/Re...
We study a version of the well-known Hospitals/Residents problem in which participants' preferences ...
Abstract. We study a version of the well-known Hospitals/Residents problem in which participants ’ p...
Motivated by the observation that most companies are more likely to consider job applicants referred...
The hospitals/residents problem is an extensively-studied many-one stable matching problem. Here, we...
The classical Hospitals/Residents problem (HR) models the assignment of junior doctors to hospitals ...
The Hospitals / Residents problem with Couples (hrc) is a generalisation of the classical Hospitals ...
The Hospitals / Residents problem with Couples (hrc) models the allocation of intending junior docto...
In the well-known Hospitals/Residents problem (HR), the objective is to find a stable matching of do...
The Hospitals / Residents problem with Couples (hrc) models the allocation of intending junior docto...
Abstract. An instance of the stable marriage problem is an undirected bipartite graph G = (X ∪ ̇ W,E...
We study variants of classical stable matching problems in which there is an additional requirement ...
The Hospitals/Residents problem is a many-to-one extension of the stable marriage problem. In an ins...
AbstractThe hospitals/residents (HR) problem is a many-to-one generalization of the stable marriage ...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
The Hospitals/Residents problem with Couples (HRC) is a generalisation of the classical Hospitals/Re...
We study a version of the well-known Hospitals/Residents problem in which participants' preferences ...
Abstract. We study a version of the well-known Hospitals/Residents problem in which participants ’ p...
Motivated by the observation that most companies are more likely to consider job applicants referred...
The hospitals/residents problem is an extensively-studied many-one stable matching problem. Here, we...
The classical Hospitals/Residents problem (HR) models the assignment of junior doctors to hospitals ...
The Hospitals / Residents problem with Couples (hrc) is a generalisation of the classical Hospitals ...
The Hospitals / Residents problem with Couples (hrc) models the allocation of intending junior docto...
In the well-known Hospitals/Residents problem (HR), the objective is to find a stable matching of do...
The Hospitals / Residents problem with Couples (hrc) models the allocation of intending junior docto...
Abstract. An instance of the stable marriage problem is an undirected bipartite graph G = (X ∪ ̇ W,E...
We study variants of classical stable matching problems in which there is an additional requirement ...
The Hospitals/Residents problem is a many-to-one extension of the stable marriage problem. In an ins...
AbstractThe hospitals/residents (HR) problem is a many-to-one generalization of the stable marriage ...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
The Hospitals/Residents problem with Couples (HRC) is a generalisation of the classical Hospitals/Re...