Kneser ranks of random graphs and minimum difference representations

Abstract

Every graph G=(V,E) is an induced subgraph of some Kneser graph of rank k, i.e., there is an assignment of (distinct) k-sets v Av to the vertices v∈ V such that Au and Av are disjoint if and only if uv∈ E. The smallest such k is called the Kneser rank of G and denoted by f Kneser(G). As an application of a result of Frieze and Reed concerning the clique cover number of random graphs we show that for constant 0< p< 1 there exist constants ci=ci(p)>0, i=1,2 such that with high probability \[ c1 n/( n)< f Kneser(G) < c2 n/( n). \] We apply this for other graph representations defined by Boros, Gurvich and Meshulam. A k-min-difference representation of a graph G is an assignment of a set Ai to each vertex i∈ V(G) such that \[ ij∈ E(G) \,\, \, \, \|Ai Aj|,|Aj Ai| \≥ k. \] The smallest k such that there exists a k-min-difference representation of G is denoted by f(G). Balogh and Prince proved in 2009 that for every k there is a graph G with f(G)≥ k. We prove that there are constants c''1, c''2>0 such that c''1 n/( n)< f(G) < c''2n/( n) holds for almost all bipartite graphs G on n+n vertices.