Trivial colors in colorings of Kneser graphs

Abstract

We show that any proper coloring of a Kneser graph KGn,k with n-2k+2 colors contains a trivial color (i.e., a color consisting of sets that all contain a fixed element), provided n>(2+)k2, where 0 as k ∞. This bound is essentially tight. This is a consequence of a more general result on the minimum number of non-trivial colors needed to properly color KGn,k.