Balanced independent sets and colorings of hypergraphs

Abstract

A k-uniform hypergraph H = (V, E) is k-partite if V can be partitioned into k sets V1, …, Vk such that every edge in E contains precisely one vertex from each Vi. We call such a graph n-balanced if |Vi| = n for each i. An independent set I in H is balanced if |I Vi| = |I Vj| for each 1 ≤ i, j ≤ k, and a coloring is balanced if each color class induces a balanced independent set in H. In this paper, we provide a lower bound on the balanced independence number αb(H) in terms of the average degree D = |E|/n, and an upper bound on the balanced chromatic number b(H) in terms of the maximum degree . Our results recover those of recent work of Chakraborti for k = 2.

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