Unit Incomparability Dimension and Clique Cover Width in Graphs

Abstract

For a clique cover C in the undirected graph G, the clique cover graph of C is the graph obtained by contracting the vertices of each clique in C into a single vertex. The clique cover width of G, denoted by CCW(G), is the minimum value of the bandwidth of all clique cover graphs in G. Any G with CCW(G)=1 is known to be an incomparability graph, and hence is called, a unit incomparability graph. We introduced the unit incomparability dimension of G, denoted byUdim(G), to be the smallest integer d so that there are unit incomparability graphs Hi with V(Hi)=V(G), i=1,2,...,d, so that E(G)=i=1d E(Gi). We prove a decomposition theorem establishing the inequality Udim(G) CCW(G). Specifically, given any G, there are unit incomparability graphs H1,H2,...,HCC(W) with V(Hi)=V(G) so that and E(G)=i=1CCW E(Hi). In addition, Hi is co-bipartite, for i=1,2,...,CCW(G)-1. Furthermore, we observe that CCW(G) s(G)/2-1, where s(G) is the number of leaves in a largest induced star of G , and use Ramsey Theory to give an upper bound on s(G), when G is represented as an intersection graph using our decomposition theorem. Finally, when G is an incomparability graph we prove that CCW (G) s(G)-1.