Bounds for the Clique Cover Width of Factors of the Apex Graph of the Planar Grid

Abstract

The clique cover width of G, denoted by ccw(G), is the minimum value of the bandwidth of all graphs that are obtained by contracting the cliques in a clique cover of G into a single vertex. For i=1,2,...,d, let Gi be a graph with V(Gi)=V, and let G be a graph with V(G)=V and E(G)=i=1d(Gi), then we write G=i=1dGi and call each Gi,i=1,2,...,d a factor of G. We are interested in the case where G1 is chordal, and ccw(Gi),i=2,3...,d for each factor Gi is "small". Here we show a negative result. Specifically, let G(k,n) be the graph obtained by joining a set of k apex vertices of degree n2 to all vertices of an n× n grid, and then adding some possible edges among these k vertices. We prove that if G(k,n)=i=1dGi, with G1 being chordal, then, max2 i d\ccw(Gi)\ n1 d-1 2.(2c)1 d-1, where c is a constant. Furthermore, for d=2, we construct a chordal graph G1 and a graph G2 with ccw(G2) n 2+k so that G(k,n)=G1 G2. Finally, let G be the clique sum graph of G(ki, ni), i=1,2,...t, where the underlying grid is ni× ni and the sum is taken at apex vertices. Then, we show G=G1 G2, where, G1 is chordal and ccw(G2) Σi=1t(ni+ki). The implications and applications of the results are discussed, including addressing a recent question of David Wood.