The problem of finding a maximum cardinality matching in a d-partite, d-uniform hypergraph is an important problem in combinatorial optimization and has been theoretically analyzed. We first generalize some graph matching heuristics for this problem. We then propose a novel heuristic based on tensor scaling to extend the matching via judicious hyperedge selections. Experiments on random, synthetic and real-life hypergraphs show that this new heuristic is highly practical and superior to the others on finding a matching with large cardinality
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
A matching of a graph is a subset of edges no two of which share a common vertex, and a maximum matc...
Let $m_d(k,n)$ be the minimal $m$ such that every $k$-uniform hypergraph on $n$ vertices and with mi...
The problem of finding a maximum cardinality matching in a d-partite, d-uniform hypergraph is an imp...
The problem of finding a maximum cardinality matching in a d-partite d-uniform hypergraph is an impo...
International audienceWe propose heuristics for approximating the maximum cardinality matching on un...
AbstractIn this paper we study degree conditions which guarantee the existence of perfect matchings ...
A hypergraph is a generalization of a graph where each hyperedge can contain an arbitrary number of ...
In this BSc thesis we focus on one of the most important topics in combinatorial optimization, known...
The question of finding the threshold for perfect matchings in random k-uniform hypergraphs dates ba...
Abstract — Finding a maximum cardinality matching in a graph is a problem appearing in numerous sett...
We study the stochastic matching problem on k-uniform hypergraphs. In this problem, we are given a h...
Abstract: The paper surveys the techniques used for designing the most efficient algorithms for find...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
Feature matching is used to build correspondences between features in the model and test images. As ...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
A matching of a graph is a subset of edges no two of which share a common vertex, and a maximum matc...
Let $m_d(k,n)$ be the minimal $m$ such that every $k$-uniform hypergraph on $n$ vertices and with mi...
The problem of finding a maximum cardinality matching in a d-partite, d-uniform hypergraph is an imp...
The problem of finding a maximum cardinality matching in a d-partite d-uniform hypergraph is an impo...
International audienceWe propose heuristics for approximating the maximum cardinality matching on un...
AbstractIn this paper we study degree conditions which guarantee the existence of perfect matchings ...
A hypergraph is a generalization of a graph where each hyperedge can contain an arbitrary number of ...
In this BSc thesis we focus on one of the most important topics in combinatorial optimization, known...
The question of finding the threshold for perfect matchings in random k-uniform hypergraphs dates ba...
Abstract — Finding a maximum cardinality matching in a graph is a problem appearing in numerous sett...
We study the stochastic matching problem on k-uniform hypergraphs. In this problem, we are given a h...
Abstract: The paper surveys the techniques used for designing the most efficient algorithms for find...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
Feature matching is used to build correspondences between features in the model and test images. As ...
We present an improved average case analysis of the maximum cardinality matching problem. We show th...
A matching of a graph is a subset of edges no two of which share a common vertex, and a maximum matc...
Let $m_d(k,n)$ be the minimal $m$ such that every $k$-uniform hypergraph on $n$ vertices and with mi...