On the colorability of bi-hypergraphs
Abstract
A mixed hypergraph H=( V, C, D) consists of the vertex set V and two families of subsets of 2 V: the family C of co-edges and the family D of edges. H is said to be colorable if there is a mapping f from V to the set of positive integers such that |\f(v):v∈ e\|<|e| for each e∈ C and |\f(v):v∈ e\|>1 for each e∈ D. There exist mixed hypergraphs which are uncolorable, and quite little about these mixed hypergraphs is known. A mixed hypergraph is called a bi-hypergraph if its co-edge set and edge set are the same. In this article, we first apply Lov\'asz local lemma to show that any r-uniform bi-hypergraph with r 4 is colorable if every edge is incident to less than (r-1)r-1e-1-1 other edges, where e is the base of natural logarithms. Then, we show that among all the uncolorable 3-uniform bi-hypergraphs, the smallest size of a minimal one is ten, which answers a question raised by Tuza and Voloshin in 2000. As an extension, we provide a minimal uncolorable 3-uniform bi-hypergraph of order n and size at most 7n3-4 for every n 6.
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