The chromatic number of almost stable Kneser hypergraphs

Abstract

Let V(n,k,s) be the set of k-subsets S of [n] such that for all i,j∈ S, we have |i-j|≥ s We define almost s-stable Kneser hypergraph KGr[n] ks-stab to be the r-uniform hypergraph whose vertex set is V(n,k,s) and whose edges are the r-uples of disjoint elements of V(n,k,s). With the help of a Zp-Tucker lemma, we prove that, for p prime and for any n≥ kp, the chromatic number of almost 2-stable Kneser hypergraphs KGp [n] k2-stab is equal to the chromatic number of the usual Kneser hypergraphs KGp[n] k, namely that it is equal to n-(k-1)pp-1. Defining μ(r) to be the number of prime divisors of r, counted with multiplicities, this result implies that the chromatic number of almost 2μ(r)-stable Kneser hypergraphs KGr[n] k2μ(r)-stab is equal to the chromatic number of the usual Kneser hypergraphs KGr[n] k for any n≥ kr, namely that it is equal to n-(k-1)rr-1.