Connected cubic graphs with the maximum number of perfect matchings

Abstract

It is proved that for n ≥ 6, the number of perfect matchings in a simple connected cubic graph on 2n vertices is at most 4 fn-1, with fn being the n-th Fibonacci number. The unique extremal graph is characterized as well. In addition, it is shown that the number of perfect matchings in any cubic graph G equals the expected value of a random variable defined on all 2-colorings of edges of G. Finally, an improved lower bound on the maximum number of cycles in a cubic graph is provided.