Lower bounds for the chromatic number of certain Kneser-type hypergraphs

Abstract

Let n 1, r 2, and s 0 be integers and P=\P1,…, Pl\ be a partition of [n]=\1,…, n\ with |Pi| r for i=1,…, l. Also, let F be a family of non-empty subsets of [n]. The r-uniform Kneser-type hypergraph KGr( F, P,s) is the hypergraph with the vertex set of all P-admissible elements F∈ F, that is |F Pi| 1 for i=1,…, l and the edge set of all r-subsets \F1,…, Fr\ of the vertex set that |Fi Fj| s for all 1 i<j r. In this article, we extend the equitable r-colorability defect ecdr( F) of Abyazi Sani and Alishahi to the case when one allows intersection among the vertices of an edge. It will be denoted by ecdr( F,s). We then, give (under certain assumptions) lower bounds for the chromatic number of KGr( F, P,s) and some of its variants in terms of ecdr( F, s/2). This work generalizes many existing results in the literature of the Kneser hypergraphs. It generalizes the previous results of the current authors from the special family of all k-subsets of [n] to a general family F of subsets.