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). After observing that, in this cardinal setting, stable fractional matchings can have much higher social welfare than stable integral ones, our goal is to understand the computational complexity of finding an optimal (i.e., welfare-maximizing) or nearly-optimal stable fractional matching. We present simple approximation algorithms for this problem with weak welfare guarantees and, rather unexpectedly, we furthermore show that achieving better approximations is hard. This computational hardness persists even for approximate stability. To the best of our knowledge, th...
AbstractWe consider instances of the classical stable marriage problem in which persons may include ...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
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...
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...
AbstractThe theory of linear inequalities and linear programming was recently applied to study the s...
Consider the bipartite matching problem with two sets of participants: men (L) and women (R). Each p...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
In an instance G = (A union B, E) of the stable marriage problem with strict and possibly incomplete...
We study deviations by a group of agents in the three main types of matching markets: the house allo...
In the stable matching problem, given a two-sided matching market where each agent has ordinal prefe...
In this paper, we consider the complexity of the problem of finding a stable fractional matching in ...
AbstractWe consider instances of the classical stable marriage problem in which persons may include ...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
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...
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...
AbstractThe theory of linear inequalities and linear programming was recently applied to study the s...
Consider the bipartite matching problem with two sets of participants: men (L) and women (R). Each p...
When ties and incomplete preference lists are permitted in the Stable Marriage and Hospitals/Residen...
In an instance G = (A union B, E) of the stable marriage problem with strict and possibly incomplete...
We study deviations by a group of agents in the three main types of matching markets: the house allo...
In the stable matching problem, given a two-sided matching market where each agent has ordinal prefe...
In this paper, we consider the complexity of the problem of finding a stable fractional matching in ...
AbstractWe consider instances of the classical stable marriage problem in which persons may include ...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...