Chordal bipartite graphs, biclique vertex partitions and Castelnuovo-Mumford regularity of 1-subdivision graphs
Abstract
A biclique in a graph G is a complete bipartite subgraph (not necessarily induced), and the least positive integer k for which the vertex set of G can be partitioned into at most k bicliques is the biclique vertex partition number bp(G) of G. We prove that the inequality reg(S(G))≥ |G|-bp(G) holds for every graph G, where S(G) is the 1-subdivision graph of G and reg(S(G)) denotes the (Castelnuovo-Mumford) regularity of the graph S(G). In particular, we show that the equality reg(S(B))=|B|-bp(B) holds provided that B is a chordal bipartite graph. Furthermore, for every chordal bipartite graph B, we prove that the independence complex of S(B) is either contractible or homotopy equivalent to a sphere, and provide a polynomial time checkable criteria for when it is contractible, and describe the dimension of the sphere when it is not.
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