We show that the ratio of matched individuals to blocking pairs grows linearly with the number of propose–accept rounds executed by the Gale–Shapley algorithm for the stable marriage problem. Consequently, the participants can arrive at an almost stable matching even without full information about the problem instance; for each participant, knowing only its local neighbourhood is enough. In distributed-systems parlance, this means that if each person has only a constant number of acceptable partners, an almost stable matching emerges after a constant number of synchronous communication rounds. We apply our results to give a distributed (2 + ε)-approximation algorithm for maximum-weight matching in bicoloured graphs and a centralised randomi...
We consider the problem of computing a large stable matching in a bipartite graph where each vertex ...
[[abstract]]In 1974, Dijsktra defined a self-stabilizing system as a system which is guaranteed to a...
AbstractWe obtain a family of algorithms that determine stable matchings for the stable marriage pro...
We show that the ratio of matched individuals to blocking pairs grows linearly with the number of pr...
We show that the ratio of matched individuals to blocking pairs grows linearly with the number of pr...
We study the stable marriage problem in a distributed setting. The communication network is a bipart...
The Stable Marriage Problem (SMP) is concerned with the follow scenario: suppose we have two disjoin...
We consider the distributed complexity of the stable mar-riage problem. In this problem, the communi...
Consider a complete bipartite graph of 2n nodes with n nodes on each side. In a round, each node can...
When ties and incomplete preference lists are permitted in the Stable Marriage problem, stable match...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
We consider the problem of computing a large stable matching in a bipartite graph G = (A ∪ B, E) whe...
International audienceStable matching (also called stable marriage in the literature) is a problem o...
Our input is a bipartite graph G=(Acup B,E) where each vertex in Acup B has a preference list strict...
Stable matching (also called stable marriage in the literature) is a problem of matching in a bipart...
We consider the problem of computing a large stable matching in a bipartite graph where each vertex ...
[[abstract]]In 1974, Dijsktra defined a self-stabilizing system as a system which is guaranteed to a...
AbstractWe obtain a family of algorithms that determine stable matchings for the stable marriage pro...
We show that the ratio of matched individuals to blocking pairs grows linearly with the number of pr...
We show that the ratio of matched individuals to blocking pairs grows linearly with the number of pr...
We study the stable marriage problem in a distributed setting. The communication network is a bipart...
The Stable Marriage Problem (SMP) is concerned with the follow scenario: suppose we have two disjoin...
We consider the distributed complexity of the stable mar-riage problem. In this problem, the communi...
Consider a complete bipartite graph of 2n nodes with n nodes on each side. In a round, each node can...
When ties and incomplete preference lists are permitted in the Stable Marriage problem, stable match...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
We consider the problem of computing a large stable matching in a bipartite graph G = (A ∪ B, E) whe...
International audienceStable matching (also called stable marriage in the literature) is a problem o...
Our input is a bipartite graph G=(Acup B,E) where each vertex in Acup B has a preference list strict...
Stable matching (also called stable marriage in the literature) is a problem of matching in a bipart...
We consider the problem of computing a large stable matching in a bipartite graph where each vertex ...
[[abstract]]In 1974, Dijsktra defined a self-stabilizing system as a system which is guaranteed to a...
AbstractWe obtain a family of algorithms that determine stable matchings for the stable marriage pro...