Tight upper bound on the maximum anti-forcing numbers of graphs

Abstract

Let G be a simple graph with a perfect matching. Deng and Zhang showed that the maximum anti-forcing number of G is no more than the cyclomatic number. In this paper, we get a novel upper bound on the maximum anti-forcing number of G and investigate the extremal graphs. If G has a perfect matching M whose anti-forcing number attains this upper bound, then we say G is an extremal graph and M is a nice perfect matching. We obtain an equivalent condition for the nice perfect matchings of G and establish a one-to-one correspondence between the nice perfect matchings and the edge-involutions of G, which are the automorphisms α of order two such that v and α(v) are adjacent for every vertex v. We demonstrate that all extremal graphs can be constructed from K2 by implementing two expansion operations, and G is extremal if and only if one factor in a Cartesian decomposition of G is extremal. As examples, we have that all perfect matchings of the complete graph K2n and the complete bipartite graph Kn, n are nice. Also we show that the hypercube Qn, the folded hypercube FQn (n≥4) and the enhanced hypercube Qn, k (0≤ k≤ n-4) have exactly n, n+1 and n+1 nice perfect matchings respectively.