Edge-partitioning a graph into paths: beyond the Bar\'at-Thomassen conjecture

Abstract

The Bar\'at-Thomassen conjecture asserts that there is a function f such that for every fixed tree T with t edges, every graph which is f(t)-edge-connected with its number of edges divisible by t has a partition of its edges into copies of T. This has been proved in the case of paths of length 2k by Thomassen, and recently shown to be true for all paths by Botler, Mota, Oshiro and Wakabayashi. Our goal in this paper is to propose an alternative proof of the path case with a weaker hypothesis: Namely, we prove that there is a function f such that every 24-edge-connected graph with minimum degree f(t) has an edge-partition into paths of length t whenever t divides the number of edges. We also show that 24 can be dropped to 4 when the graph is eulerian.