We introduce a restriction of the stable roommates problem in which roommate pairs are ranked globally. In contrast to the unrestricted problem, weakly stable matchings are guaranteed to exist, and additionally, can be found in polynomial time. However, it is still the case that strongly stable matchings may not exist, and so we consider the complexity of finding weakly stable matchings with various desirable properties. In particular, we present a polynomial-time algorithm to find a rank-maximal (weakly stable) matching. This is the first generalization of the algorithm due to Irving et al. [18] to a non-bipartite setting. Also, we prove several hardness results in an even more restricted setting for each of the problems of finding weakly ...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
We consider two variants of the classical Stable Roommates problem with Incomplete (but strictly ord...
AbstractIn the Stable Marriage and Roommates problems, a set of agents is given, each of them having...
We introduce a restriction of the stable roommates problem in which roommate pairs are ranked global...
We introduce a restriction of the stable roommates problem in which roommate pairs are ranked global...
AbstractIn this paper, we describe an efficient algorithm that decides if a stable matching exists f...
AbstractAn instance of the classical Stable Roommates problem need not admit a stable matching. Prev...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
In this paper, we describe an efficient algorithm that decides if a stable matching exists for a gen...
The stable roommates problem is a well-known problem of matching n people into n/2 disjoint pairs so...
We study the variant of the well-known stable roommates problem in which participants are permitted ...
An instance of the classical Stable Roommates problem (SR) need not admit a stable matching. This m...
The classic Stable Roommates problem (the non-bipartite generalization of the well-known Stable Marr...
This paper deals with roommate problems (Gale and Shapley, Am Math Mon 69(1):9–15, 1962) that are so...
AbstractIt is known that there may not exist any stable matching for a given instance of the stable ...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
We consider two variants of the classical Stable Roommates problem with Incomplete (but strictly ord...
AbstractIn the Stable Marriage and Roommates problems, a set of agents is given, each of them having...
We introduce a restriction of the stable roommates problem in which roommate pairs are ranked global...
We introduce a restriction of the stable roommates problem in which roommate pairs are ranked global...
AbstractIn this paper, we describe an efficient algorithm that decides if a stable matching exists f...
AbstractAn instance of the classical Stable Roommates problem need not admit a stable matching. Prev...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
In this paper, we describe an efficient algorithm that decides if a stable matching exists for a gen...
The stable roommates problem is a well-known problem of matching n people into n/2 disjoint pairs so...
We study the variant of the well-known stable roommates problem in which participants are permitted ...
An instance of the classical Stable Roommates problem (SR) need not admit a stable matching. This m...
The classic Stable Roommates problem (the non-bipartite generalization of the well-known Stable Marr...
This paper deals with roommate problems (Gale and Shapley, Am Math Mon 69(1):9–15, 1962) that are so...
AbstractIt is known that there may not exist any stable matching for a given instance of the stable ...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
We consider two variants of the classical Stable Roommates problem with Incomplete (but strictly ord...
AbstractIn the Stable Marriage and Roommates problems, a set of agents is given, each of them having...