The maximum number of perfect matchings of semi-regular graphs

Abstract

Let n 34 be an even integer, and Dn=2 n/4 -1. In this paper, we prove that every \Dn,\,Dn+1\-graph of order n contains n/4 disjoint perfect matchings. This result is sharp in the sense that (i) there exists a \Dn,\,Dn+1\-graph containing exactly n/4 disjoint perfect matchings, and that (ii) there exists a \Dn-1,\,Dn\-graph without perfect matchings for each n. As a consequence, for any integer D Dn, every \D,\,D+1\-graph of order n contains (D+1)/2 disjoint perfect matchings. This extends Csaba et~al.'s breathe-taking result that every D-regular graph of sufficiently large order is 1-factorizable, generalizes Zhang and Zhu's result that every Dn-regular graph of order n contains n/4 disjoint perfect matchings, and improves Hou's result that for all k n/2, every \k,\,k+1\-graph of order n contains ( n/3+1+k-n/2) disjoint perfect matchings.