Covering the edges of a graph with perfect matchings

Abstract

An r-graph is an r-regular graph with no odd cut of size less than r. A well-celebrated result due to Lov\'asz says that for such graphs the linear system Ax = 1 has a solution in Z/2, where A is the 0,1 edge to perfect matching incidence matrix. Note that we allow x to have negative entries. In this paper, we present an improved version of Lov\'asz's result, proving that, in fact, there is a solution x with all entries being either integer or +1/2 and corresponding to a linearly independent set of perfect matchings. Moreover, the total number of +1/2's is at most 6k, where k is the number of Petersen bricks in the tight cut decomposition of the graph.