On the 1-factors of n-connected graphs

Abstract L. W. Beineke and M. D. Plummer have recently proved [1] that every n -connected graph with a 1-factor has at least n different 1-factors. The main purpose of this paper is to prove that every n -connected graph with a 1-factor has at least as many as n ( n − 2)( n − 4) … 4 · 2, (or: n ( n − 2)( n − 4) … 5 · 3) 1-factors. The main lemma used is: if a 2-connected graph G has a 1-factor, then G contains a vertex V (and even two such vertices), such that each edge of G , incident to V , belongs to some 1-factor of G .