The stable marriage problem is to find a matching between men and women, considering preference lists in which each person expresses his/her preference over the members of the opposite gender. The output matching must be stable, which intuitively means that there is no man- woman pair both of which have incentive to elope. This problem was introduced in 1962 in the seminal paper of Gale and Shapley, and has attracted researchers in several areas, including mathematics, economics, game theory, computer science, etc. This paper introduces old and recent results on the stable marriage problem and some other related problems
The stable matching problem (also known as the stable marriage problem) is a well-known problem of m...
AbstractA stable matching is a complete matching of men and women such that no man and woman who are...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
In 1962, David Gale and Lloyd Shapley proved that, for any equal number of men and women, and each m...
Abstract. The stable marriage problem is a well-known problem of matching men to women so that no ma...
We study variants of the classical stable marriage problem in which the preferences of the men or th...
We study variants of the classical stable marriage problem in which the preferences of the men or th...
In this paper the well-known Stable Marriage Problem is considered once again. The name of this pro...
Abstract—A stable marriage problem (SMP) of size n involves n men and n women, each of whom has orde...
AbstractWe study variants of the classical stable marriage problem in which the preferences of the m...
AbstractThe stable marriage problem is a game theoretic model introduced by Gale and Shapley (1962)....
“The Stable marriage problem (SMP) is basically the problem of finding a stable matchingbetween two ...
Every instance of the Stable Marriage Problem involves two finite sets of equal size. We can think o...
AbstractIt is well known that every instance of the classical stable marriage problem admits at leas...
AbstractWe obtain a family of algorithms that determine stable matchings for the stable marriage pro...
The stable matching problem (also known as the stable marriage problem) is a well-known problem of m...
AbstractA stable matching is a complete matching of men and women such that no man and woman who are...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
In 1962, David Gale and Lloyd Shapley proved that, for any equal number of men and women, and each m...
Abstract. The stable marriage problem is a well-known problem of matching men to women so that no ma...
We study variants of the classical stable marriage problem in which the preferences of the men or th...
We study variants of the classical stable marriage problem in which the preferences of the men or th...
In this paper the well-known Stable Marriage Problem is considered once again. The name of this pro...
Abstract—A stable marriage problem (SMP) of size n involves n men and n women, each of whom has orde...
AbstractWe study variants of the classical stable marriage problem in which the preferences of the m...
AbstractThe stable marriage problem is a game theoretic model introduced by Gale and Shapley (1962)....
“The Stable marriage problem (SMP) is basically the problem of finding a stable matchingbetween two ...
Every instance of the Stable Marriage Problem involves two finite sets of equal size. We can think o...
AbstractIt is well known that every instance of the classical stable marriage problem admits at leas...
AbstractWe obtain a family of algorithms that determine stable matchings for the stable marriage pro...
The stable matching problem (also known as the stable marriage problem) is a well-known problem of m...
AbstractA stable matching is a complete matching of men and women such that no man and woman who are...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...