We study a version of the well-known Hospitals/Residents problem in which participants' preferences may involve ties or other forms of indifference. In this context, we investigate the concept of strong stability, arguing that this may be the most appropriate and desirable form of stability in many practical situations. When the indifference is in the form of ties, we describe an O(a^2) algorithm to find a strongly stable matching, if one exists, where a is the number of mutually acceptable resident-hospital pairs. We also show a lower bound in this case in terms of the complexity of determining whether a bipartite graph contains a perfect matching. By way of contrast, we prove that it becomes NP-complete to determine whether a strongly sta...
We study variants of classical stable matching problems in which there is an additional requirement ...
In the well-known Hospitals/Residents problem (HR), the objective is to find a stable matching of do...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
Abstract. We study a version of the well-known Hospitals/Residents problem in which participants ’ p...
We study a version of the well-known Hospitals/Residents problem in which participants' preferences ...
The hospitals/residents problem is an extensively-studied many-one stable matching problem. Here, we...
Abstract. An instance of the stable marriage problem is an undirected bipartite graph G = (X ∪ ̇ W,E...
In the Hospitals/Residents (HR) problem, agents are partitioned into hospitals and residents. Each a...
Motivated by the serious problem that hospitals in rural areas suffer from a shortage of residents, ...
The Hospitals / Residents problem with Couples (hrc) is a generalisation of the classical Hospitals ...
When ties and incomplete preference lists are permitted in the stable marriage and hospitals/residen...
The classical Hospitals/Residents problem (HR) models the assignment of junior doctors to hospitals ...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
The Hospitals/Residents problem is a many-to-one extension of the stable marriage problem. In an ins...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
We study variants of classical stable matching problems in which there is an additional requirement ...
In the well-known Hospitals/Residents problem (HR), the objective is to find a stable matching of do...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
Abstract. We study a version of the well-known Hospitals/Residents problem in which participants ’ p...
We study a version of the well-known Hospitals/Residents problem in which participants' preferences ...
The hospitals/residents problem is an extensively-studied many-one stable matching problem. Here, we...
Abstract. An instance of the stable marriage problem is an undirected bipartite graph G = (X ∪ ̇ W,E...
In the Hospitals/Residents (HR) problem, agents are partitioned into hospitals and residents. Each a...
Motivated by the serious problem that hospitals in rural areas suffer from a shortage of residents, ...
The Hospitals / Residents problem with Couples (hrc) is a generalisation of the classical Hospitals ...
When ties and incomplete preference lists are permitted in the stable marriage and hospitals/residen...
The classical Hospitals/Residents problem (HR) models the assignment of junior doctors to hospitals ...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
The Hospitals/Residents problem is a many-to-one extension of the stable marriage problem. In an ins...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
We study variants of classical stable matching problems in which there is an additional requirement ...
In the well-known Hospitals/Residents problem (HR), the objective is to find a stable matching of do...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...