On the neighborhood complex of s-stable Kneser graphs

Abstract

In 2002, A. Bj\"orner and M. de Longueville showed the neighborhood complex of the 2-stable Kneser graph KG(n, k)2-stab has the same homotopy type as the (n-2k)-sphere. A short time ago, an analogous result about the homotopy type of the neighborhood complex of almost s-stable Kneser graph has been announced by J. Oszt\'enyi. Combining this result with the famous Lov\'asz's topological lower bound on the chromatic number of graphs has been yielded a new way for determining the chromatic number of these graphs which was determined a bit earlier by P. Chen. In this paper we present a common generalization of the mentioned results. We will define the s-stable Kneser graph KG(n, k)s-stab as the induced subgraph of the Kneser graph KG(n, k) on s-stable vertices. And we prove, for given an integer vector s=(s1,…, sk) and n≥Σi=1k-1si+2 where si≥2 for i≠ k and sk∈\1,2\, the neighborhood complex of KG(n, k)s-stab is homotopy equivalent to the (n-Σi=1k-1si-2)-sphere. In particular, this implies that (KG(n, k)s-stab)= n-Σi=1k-1si for the mentioned parameters. Moreover, as a simple corollary of the previous result, we will determine the chromatic number of 3-stable kneser graphs with at most one error.