Odd decompositions of eulerian graphs

Abstract

We prove that an eulerian graph G admits a decomposition into k closed trails of odd length if and only if and it contains at least k pairwise edge-disjoint odd circuits and k |E(G)|2. We conjecture that a connected 2d-regular graph of odd order with d 1 admits a decomposition into d odd closed trails sharing a common vertex and verify the conjecture for d 3. The case d=3 is crucial for determining the flow number of a signed eulerian graph which is treated in a separate paper (arXiv:1408.1703v2). The proof of our conjecture for d=3 is surprisingly difficult and calls for the use of signed graphs as a convenient technical tool.