Decomposing graphs into a constant number of locally irregular subgraphs

Abstract

A graph is locally irregular if no two adjacent vertices have the same degree. The irregular chromatic index irr'(G) of a graph G is the smallest number of locally irregular subgraphs needed to edge-decompose G. Not all graphs have such a decomposition, but Baudon, Bensmail, Przybyo, and Wo\'zniak conjectured that if G can be decomposed into locally irregular subgraphs, then irr'(G)≤ 3. In support of this conjecture, Przybyo showed that irr'(G)≤ 3 holds whenever G has minimum degree at least 1010. Here we prove that every bipartite graph G which is not an odd length path satisfies irr'(G)≤ 10. This is the first general constant upper bound on the irregular chromatic index of bipartite graphs. Combining this result with Przybyo's result, we show that irr'(G) ≤ 328 for every graph G which admits a decomposition into locally irregular subgraphs. Finally, we show that irr'(G)≤ 2 for every 16-edge-connected bipartite graph G.