English

Unit Incomparability Dimension and Clique Cover Width in Graphs

Combinatorics 2017-05-15 v1 Data Structures and Algorithms

Abstract

For a clique cover CC in the undirected graph GG, the {\it clique cover graph} of CC is the graph obtained by contracting the vertices of each clique in CC into a single vertex. The {\it clique cover width} of GG, denoted by CCW(G)CCW(G), is the minimum value of the bandwidth of all clique cover graphs in GG. Any GG with CCW(G)=1CCW(G)=1 is known to be an incomparability graph, and hence is called, a {\it unit incomparability graph}. We introduced the {\it unit incomparability dimension of GG}, denoted byUdim(G)Udim(G), to be the smallest integer dd so that there are unit incomparability graphs HiH_i with V(Hi)=V(G),i=1,2,...,dV(H_i)=V(G), i=1,2,...,d, so that E(G)=i=1dE(Gi)E(G)=\cap_{i=1}^d E(G_i). We prove a decomposition theorem establishing the inequality Udim(G)CCW(G)Udim(G)\le CCW(G). Specifically, given any GG, there are unit incomparability graphs H1,H2,...,HCC(W)H_1,H_2,...,H_{CC(W)} with V(Hi)=V(G)V(H_i)=V(G) so that and E(G)=i=1CCWE(Hi)E(G)=\cap_{i=1}^{CCW} E(H_i). In addition, HiH_i is co-bipartite, for i=1,2,...,CCW(G)1i=1,2,...,CCW(G)-1. Furthermore, we observe that CCW(G)s(G)/21CCW(G)\ge s(G)/2-1, where s(G)s(G) is the number of leaves in a largest induced star of GG , and use Ramsey Theory to give an upper bound on s(G)s(G), when GG is represented as an intersection graph using our decomposition theorem. Finally, when GG is an incomparability graph we prove that CCW(G)s(G)1CCW (G)\le s(G)-1.

Keywords

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}
}
R2 v1 2026-06-22T19:44:41.328Z