Homotopy type of Neighborhood Complexes of Kneser graphs, KG2,k

Abstract

Schrijver identified a family of vertex critical subgraphs of the Kneser graphs called the stable Kneser graphs SGn,k. Bj\"orner and de Longueville proved that the neighborhood complex of the stable Kneser graph SGn,k is homotopy equivalent to a k-sphere. In this article, we prove that the homotopy type of the neighborhood complex of the Kneser graph KG2,k is a wedge of (k+4)(k+1)+1 spheres of dimension k. We construct a maximal subgraph S2,k of KG2,k, whose neighborhood complex is homotopy equivalent to the neighborhood complex of SG2,k. Further, we prove that the neighborhood complex of S2,k deformation retracts onto the neighborhood complex of SG2,k.