Packing graphs of bounded codegree

Abstract

Two graphs G1 and G2 on n vertices are said to pack if there exist injective mappings of their vertex sets into [n] such that the images of their edge sets are disjoint. A longstanding conjecture due to Bollob\'as and Eldridge and, independently, Catlin, asserts that, if (1(G)+1) (2(G)+1) n+1, then G1 and G2 pack. We consider the validity of this assertion under the additional assumption that G1 or G2 has bounded codegree. In particular, we prove for all t 2 that, if G1 contains no copy of the complete bipartite graph K2,t and 1 > 17 t · 2, then (1(G)+1) (2(G)+1) n+1 implies that G1 and G2 pack. We also provide a mild improvement if moreover G2 contains no copy of the complete tripartite graph K1,1,s, s 1.