Unit Incomparability Dimension and Clique Cover Width in Graphs
Abstract
For a clique cover in the undirected graph , the {\it clique cover graph} of is the graph obtained by contracting the vertices of each clique in into a single vertex. The {\it clique cover width} of , denoted by , is the minimum value of the bandwidth of all clique cover graphs in . Any with is known to be an incomparability graph, and hence is called, a {\it unit incomparability graph}. We introduced the {\it unit incomparability dimension of }, denoted by, to be the smallest integer so that there are unit incomparability graphs with , so that . We prove a decomposition theorem establishing the inequality . Specifically, given any , there are unit incomparability graphs with so that and . In addition, is co-bipartite, for . Furthermore, we observe that , where is the number of leaves in a largest induced star of , and use Ramsey Theory to give an upper bound on , when is represented as an intersection graph using our decomposition theorem. Finally, when is an incomparability graph we prove that .
Cite
@article{arxiv.1705.04395,
title = {Unit Incomparability Dimension and Clique Cover Width in Graphs},
author = {Farhad Shahrokhi},
journal= {arXiv preprint arXiv:1705.04395},
year = {2017}
}