The Complexity of Counting Edge Colorings for Simple Graphs

Abstract

We prove #P-completeness results for counting edge colorings on simple graphs. These strengthen the corresponding results on multigraphs from [4]. We prove that for any r 3 counting -edge colorings on r-regular simple graphs is #P-complete. Furthermore, we show that for planar r-regular simple graphs where r ∈ \3, 4, 5\ counting edge colorings with appa colors for any r is also #P-complete. As there are no planar r-regular simple graphs for any r > 5, these statements cover all interesting cases in terms of the parameters (, r).