Vertex partition of hypergraphs and maximum degenerate subhypergraphs

Abstract

In 2007 Matamala proved that if G is a simple graph with maximum degree ≥ 3 not containing K +1 as a subgraph and s, t are positive integers such that s+t ≥ , then the vertex set of G admits a partition (S,T) such that G[S] is a maximum order (s-1)-degenerate subgraph of G and G[T] is a (t-1)-degenerate subgraph of G. This result extended earlier results obtained by Borodin, by Bollob\'as and Manvel, by Catlin, by Gerencs\'er and by Catlin and Lai. In this paper we prove a hypergraph version of this result and extend it to variable degeneracy and to partitions into more than two parts, thereby extending a result by Borodin, Kostochka, and Toft.