A bipartite graph G=(U,V,E) is convex if the vertices in V can be linearly ordered such that for each vertex u∈U, the neighbors of u are consecutive in the ordering of V. An induced matching H of G is a matching for which no edge of E connects endpoints of two different edges of H. We show that in a convex bipartite graph with n vertices and m weighted edges, an induced matching of maximum total weight can be computed in O(n+m) time. An unweighted convex bipartite graph has a representation of size O(n) that records for each vertex u∈U the first and last neighbor in the ordering of V. Given such a compact representation, we compute an induced matching of maximum cardinality in O(n) time. In convex bipartite graphs, maximum-cardinality induc...
. A new approximation algorithm for maximum weighted matching in general edge-weighted graphs is pre...
A bipartite graph G = (V, W, E) is convex if there exists an ordering of the vertices of W such that...
AbstractLet G(V1, V2, E) be a bipartite graph and for each edge e ∈ E a weight We is prescribed. The...
A bipartite graph G=(U,V,E) is convex if the vertices in V can be linearly ordered such that for eac...
AbstractWe present an O(n2)-time algorithm for computing a maximum cardinality induced matching and ...
AbstractThe problem of determining the maximum matching in a convex bipartite graph, G = (V1, V2, E)...
Abstract. We consider the problem of maintaining a maximum matching in a convex bipartite graph G = ...
We present a coarse grained parallel algorithm for computing a maximum matching in a convex bipartit...
. For a graph G with e edges and n vertices, and w(E) as a total edge weight, a maximum cardinality ...
A bipartite graph G=(A, B, E) is convex on B if there exists an ordering of the vertices of B such t...
AbstractWe consider the problem of finding all maximally-matchable edges in a bipartite graph G=(V,E...
Matching is a set of edges in a graph which each of the edge does not share a common vertex. Maximum...
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
Given a graph G = (V; E) and a real weight for each vertex of G, the vertex-weight of a matching is ...
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
. A new approximation algorithm for maximum weighted matching in general edge-weighted graphs is pre...
A bipartite graph G = (V, W, E) is convex if there exists an ordering of the vertices of W such that...
AbstractLet G(V1, V2, E) be a bipartite graph and for each edge e ∈ E a weight We is prescribed. The...
A bipartite graph G=(U,V,E) is convex if the vertices in V can be linearly ordered such that for eac...
AbstractWe present an O(n2)-time algorithm for computing a maximum cardinality induced matching and ...
AbstractThe problem of determining the maximum matching in a convex bipartite graph, G = (V1, V2, E)...
Abstract. We consider the problem of maintaining a maximum matching in a convex bipartite graph G = ...
We present a coarse grained parallel algorithm for computing a maximum matching in a convex bipartit...
. For a graph G with e edges and n vertices, and w(E) as a total edge weight, a maximum cardinality ...
A bipartite graph G=(A, B, E) is convex on B if there exists an ordering of the vertices of B such t...
AbstractWe consider the problem of finding all maximally-matchable edges in a bipartite graph G=(V,E...
Matching is a set of edges in a graph which each of the edge does not share a common vertex. Maximum...
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
Given a graph G = (V; E) and a real weight for each vertex of G, the vertex-weight of a matching is ...
By advancing the idea of finding width in bipartite graphs and basic definitions in matching theory,...
. A new approximation algorithm for maximum weighted matching in general edge-weighted graphs is pre...
A bipartite graph G = (V, W, E) is convex if there exists an ordering of the vertices of W such that...
AbstractLet G(V1, V2, E) be a bipartite graph and for each edge e ∈ E a weight We is prescribed. The...