We study a generalization of the classical stable matching problem that allows for cardinal preferences (as opposed to ordinal) and fractional matchings (as opposed to integral). In this cardinal setting, stable fractional matchings can have much larger social welfare than stable integral ones. Our goal is to understand the computational complexity of finding an optimal (i.e., welfare-maximizing) stable fractional matching. We consider both exact and approximate stability notions, and provide simple approximation algorithms with weak welfare guarantees. Our main result is that, somewhat surprisingly, achieving better approximations is computationally hard. To the best of our knowledge, these are the first computational complexity results fo...
We study the classical, two-sided stable marriage problem under pairwise preferences. In the most ge...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
The stable matching problem, first presented by mathematical economists Gale and Shapley, has been s...
We study a generalization of the classical stable matching problem that allows for cardinal preferen...
We study a generalization of the classical stable matching problem that allows for cardinal preferen...
We study deviations by a group of agents in the three main types of matching markets: the house allo...
This special issue of Algorithms is devoted to the study of matching problems involving ordinal pre...
AbstractThis paper continues the work of Abeledo and Rothblum, who study nonbipartite stable matchin...
In the stable matching problem we are given a bipartite graph G = (A ∪ B, E) where A and B represent...
When ties and incomplete preference lists are permitted in the Stable Marriage problem, stable match...
When ties and incomplete preference lists are permitted in the stable marriage and hospitals/residen...
To guarantee all agents are matched, the classic Deferred Acceptance algorithm needs complete prefer...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
Consider the bipartite matching problem with two sets of participants: men (L) and women (R). Each p...
In this paper, we consider the complexity of the problem of finding a stable fractional matching in ...
We study the classical, two-sided stable marriage problem under pairwise preferences. In the most ge...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
The stable matching problem, first presented by mathematical economists Gale and Shapley, has been s...
We study a generalization of the classical stable matching problem that allows for cardinal preferen...
We study a generalization of the classical stable matching problem that allows for cardinal preferen...
We study deviations by a group of agents in the three main types of matching markets: the house allo...
This special issue of Algorithms is devoted to the study of matching problems involving ordinal pre...
AbstractThis paper continues the work of Abeledo and Rothblum, who study nonbipartite stable matchin...
In the stable matching problem we are given a bipartite graph G = (A ∪ B, E) where A and B represent...
When ties and incomplete preference lists are permitted in the Stable Marriage problem, stable match...
When ties and incomplete preference lists are permitted in the stable marriage and hospitals/residen...
To guarantee all agents are matched, the classic Deferred Acceptance algorithm needs complete prefer...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
Consider the bipartite matching problem with two sets of participants: men (L) and women (R). Each p...
In this paper, we consider the complexity of the problem of finding a stable fractional matching in ...
We study the classical, two-sided stable marriage problem under pairwise preferences. In the most ge...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
The stable matching problem, first presented by mathematical economists Gale and Shapley, has been s...