Edge-decomposition of graphs into copies of a tree with four edges

Abstract

We study edge-decompositions of highly connected graphs into copies of a given tree. In particular we attack the following conjecture by Bar\'at and Thomassen: for each tree T, there exists a natural number kT such that if G is a kT-edge-connected graph, and |E(T)| divides |E(G)|, then E(G) has a decomposition into copies of T. As one of our main results it is sufficient to prove the conjecture for bipartite graphs. Let Y be the unique tree with degree sequence (1,1,1,2,3). We prove that if G is a 191-edge-connected graph of size divisible by 4, then G has a Y-decomposition. This is the first instance of such a theorem, in which the tree is different from a path or a star.