Some tight bounds on the minimum and maximum forcing numbers of graphs
Abstract
Let G be a simple graph with 2n vertices and a perfect matching. We denote by f(G) and F(G) the minimum and maximum forcing number of G, respectively. Hetyei obtained that the maximum number of edges of graphs G with a unique perfect matching is n2. We know that G has a unique perfect matching if and only if f(G)=0. Along this line, we generalize the classical result to all graphs G with f(G)=k for 0≤ k≤ n-1, and characterize corresponding extremal graphs as well. Hence we get a non-trivial lower bound of f(G) in terms of the order and size. For bipartite graphs, we gain corresponding stronger results. Further, we obtain a new upper bound of F(G). For bipartite graphs G, Che and Chen (2013) obtained that f(G)=n-1 if and only if G is complete bipartite graph Kn,n. We completely characterize all bipartite graphs G with f(G)= n-2.
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