Spectrum of mixed bi-uniform hypergraphs

Abstract

A mixed hypergraph is a triple H=(V,C,D), where V is a set of vertices, C and D are sets of hyperedges. A vertex-coloring of H is proper if C-edges are not totally multicolored and D-edges are not monochromatic. The feasible set S(H) of H is the set of all integers, s, such that H has a proper coloring with s colors. Bujt\'as and Tuza [Graphs and Combinatorics 24 (2008), 1--12] gave a characterization of feasible sets for mixed hypergraphs with all C- and D-edges of the same size r, r≥ 3. In this note, we give a short proof of a complete characterization of all possible feasible sets for mixed hypergraphs with all C-edges of size and all D-edges of size m, where , m ≥ 2. Moreover, we show that for every sequence (r(s))s=n, n ≥ , of natural numbers there exists such a hypergraph with exactly r(s) proper colorings using s colors, s = ,…,n, and no proper coloring with more than n colors. Choosing = m=r this answers a question of Bujt\'as and Tuza, and generalizes their result with a shorter proof.