This paper deals with roommate problems (Gale and Shapley, 1962) that are solvable, i.e., have a non-empty core (set of stable matchings). We study the assortativeness of stable matchings and the size of the core by means of maximal and average rank gaps. We provide upper bounds in terms of maximal and average disagreements in the agents’ rankings. Finally, we show that most of our bounds are tight
The aim of this paper is to propose a new solution for the roommate problem with strict preferences....
In the roommate problem, pairs of agents must be formed, based on ordinal preferences of the agents ...
AbstractIn this paper, we describe an efficient algorithm that decides if a stable matching exists f...
This paper deals with roommate problems (Gale and Shapley, 1962) that are solvable, i.e., have a non...
This paper deals with roommate problems (Gale and Shapley, Am Math Mon 69(1):9–15, 1962) that are so...
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...
We introduce a restriction of the stable roommates problem in which roommate pairs are ranked global...
AbstractAn instance of the classical Stable Roommates problem need not admit a stable matching. Prev...
Di¤erent solution concepts (core, stable sets, largest consistent set,...) can be de ned using eithe...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
The stable roommates problem with payments has as input a graph G = (V , E ) with an edge weighting ...
The stable roommates problem is a well-known problem of matching n people into n/2 disjoint pairs so...
This paper studies the one-to-one two-sided marriage model (Gale and Shapley 1962). If agents’ prefe...
An instance of the classical Stable Roommates problem (SR) need not admit a stable matching. This m...
The aim of this paper is to propose a new solution for the roommate problem with strict preferences....
In the roommate problem, pairs of agents must be formed, based on ordinal preferences of the agents ...
AbstractIn this paper, we describe an efficient algorithm that decides if a stable matching exists f...
This paper deals with roommate problems (Gale and Shapley, 1962) that are solvable, i.e., have a non...
This paper deals with roommate problems (Gale and Shapley, Am Math Mon 69(1):9–15, 1962) that are so...
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...
We introduce a restriction of the stable roommates problem in which roommate pairs are ranked global...
AbstractAn instance of the classical Stable Roommates problem need not admit a stable matching. Prev...
Di¤erent solution concepts (core, stable sets, largest consistent set,...) can be de ned using eithe...
An instance of the classical Stable Roommates problem need not admit a stable matching. Previous wor...
The stable roommates problem with payments has as input a graph G = (V , E ) with an edge weighting ...
The stable roommates problem is a well-known problem of matching n people into n/2 disjoint pairs so...
This paper studies the one-to-one two-sided marriage model (Gale and Shapley 1962). If agents’ prefe...
An instance of the classical Stable Roommates problem (SR) need not admit a stable matching. This m...
The aim of this paper is to propose a new solution for the roommate problem with strict preferences....
In the roommate problem, pairs of agents must be formed, based on ordinal preferences of the agents ...
AbstractIn this paper, we describe an efficient algorithm that decides if a stable matching exists f...