Haxell's condition [14] is a natural hypergraph analog of Hall's condition, which is a well-known necessary and sufficient condition for a bipartite graph to admit a perfect matching. That is, when Haxell's condition holds it forces the existence of a perfect matching in the bipartite hypergraph. Unlike in graphs, however, there is no known polynomial time algorithm to find the hypergraph perfect matching that is guaranteed to exist when Haxell's condition is satisfied.We prove the existence of an efficient algorithm to find perfect matchings in bipartite hypergraphs whenever a stronger version of Haxell's condition holds. Our algorithm can be seen as a generalization of the classical Hungarian algorithm for finding perfect matchings in bip...
Given a bipartite graph G = (U ∪ V , E ) such that |U | = |V | and every edge is labelled true or f...
This thesis contains problems in finding spanning subgraphs in graphs, such as, perfect matchings, t...
The perfect matching problem is known to be in P, in randomizedNC, and it is hard forNL. Whether the...
If $G$ is a bipartite graph, Hall's theorem \cite{H35} gives a condition for the existence of a matc...
We survey some aspects of the perfect matching problem in hypergraphs, with particular emphasis on s...
AbstractThis paper considers an algorithm for finding a perfect matching, if there is one, in a bipa...
The perfect matching problem is known to be in P, in randomized NC, and it is hard for NL. Whether t...
AbstractStrengthening the result of Rődl and Frankl (Europ. J. Combin 6 (1985) 317–326), Pippenger p...
We show that the number of k-matching in a given undirected graph G is equal to the number of perfec...
AbstractThis paper describes an algorithm for finding all the perfect matchings in a bipartite graph...
We develop a theory for the existence of perfect matchings in hypergraphs under quite general condit...
<p>We develop algorithms to approximately count perfect matchings in bipartite graphs (or permanents...
We characterize hyperfinite bipartite graphings that admit measurable perfect matchings. In particul...
In this paper, we deal with both the complexity and the approximability of the labeled perfect match...
This thesis contains problems in finding spanning subgraphs in graphs, such as, perfect matchings, t...
Given a bipartite graph G = (U ∪ V , E ) such that |U | = |V | and every edge is labelled true or f...
This thesis contains problems in finding spanning subgraphs in graphs, such as, perfect matchings, t...
The perfect matching problem is known to be in P, in randomizedNC, and it is hard forNL. Whether the...
If $G$ is a bipartite graph, Hall's theorem \cite{H35} gives a condition for the existence of a matc...
We survey some aspects of the perfect matching problem in hypergraphs, with particular emphasis on s...
AbstractThis paper considers an algorithm for finding a perfect matching, if there is one, in a bipa...
The perfect matching problem is known to be in P, in randomized NC, and it is hard for NL. Whether t...
AbstractStrengthening the result of Rődl and Frankl (Europ. J. Combin 6 (1985) 317–326), Pippenger p...
We show that the number of k-matching in a given undirected graph G is equal to the number of perfec...
AbstractThis paper describes an algorithm for finding all the perfect matchings in a bipartite graph...
We develop a theory for the existence of perfect matchings in hypergraphs under quite general condit...
<p>We develop algorithms to approximately count perfect matchings in bipartite graphs (or permanents...
We characterize hyperfinite bipartite graphings that admit measurable perfect matchings. In particul...
In this paper, we deal with both the complexity and the approximability of the labeled perfect match...
This thesis contains problems in finding spanning subgraphs in graphs, such as, perfect matchings, t...
Given a bipartite graph G = (U ∪ V , E ) such that |U | = |V | and every edge is labelled true or f...
This thesis contains problems in finding spanning subgraphs in graphs, such as, perfect matchings, t...
The perfect matching problem is known to be in P, in randomizedNC, and it is hard forNL. Whether the...