Partitions of hypergraphs under variable degeneracy constraints

Abstract

The paper deals with partitions of hypergraphs into induced subhypergraphs satisfying constraints on their degeneracy. Our hypergraphs may have multiple edges, but no loops. Given a hypergraph H and a sequence f=(f1,f2, …, fp) of p≥ 1 vertex functions fi:V(H) N0 such that f1(v)+f2(v)+ ·s + fp(v)≥ dH(v) for all v∈ V(H), we want to find a sequence (H1,H2, …, Hp) of vertex disjoint induced subhypergraphs containing all vertices of H such that each hypergraph Hi is strictly fi-degenerate, that is, for every non-empty subhypergraph H'⊂eq Hi there is a vertex v∈ V(H') such that dH'(v)<fi(v). Our main result in this paper says that such a sequence of hypergraphs exists if and only if (H,f) is not a so-called hard pair. Hard pairs form a recursively defined family of configurations, obtained from three basic types of configurations by the operation of merging a vertex. Our main result has several interesting applications related to generalized hypergraph coloring problems.