On the chromatic number of almost stable general Kneser hypergraphs

Abstract

Let n 1 and s 1 be integers. An almost s-stable subset A of [n]=\1,…,n\ is a subset such that for any two distinct elements i, j∈ A, one has |i-j| s. For a family F of non-empty subsets of [n] and an integer r 2, the chromatic number of the r-uniform Kneser hypergraph KGr( F), whose vertex set is F and whose edge set is the set of \A1,…, Ar\ of pairwise disjoint elements in F, has been studied extensively in the literature and Abyazi Sani and Alishahi were able to give a lower bound for it in terms of the equatable r-colorability defect, ecdr( F). In this article, the methods of Chen for the special family of all k-subsets of [n], are modified to give lower bounds for the chromatic number of almost stable general Kneser hypergraph KGr( Fs) in terms of ecds( F). Here Fs is the collection of almost s-stable elements of F. We also propose a generalization of a conjecture of Meunier.