Minimum forcing numbers of perfect matchings of circular and prismatic graphs

Abstract

Let G be a graph with a perfect matching. Denote by f(G) the minimum size of a matching in G that is uniquely extendable to a perfect matching in G. Diwan (2019) used linear algebra to prove that for the d-hypercube Qd (d≥ 2), f(Qd)=2d-2, thus settling a conjecture of Pachter and Kim (1998). Recently, Mohammadian generalized this method to prove a general result: for a bipartite graph G on n vertices, if G admits an involutory weighted adjacency matrix A over a field F, then f(G K2)=n2, where denotes the Cartesian product of two graphs. In this paper we obtain f(G C2k)=n when a bipartite graph G on n vertices admits an involutory weighted adjacency matrix A over a field F of characteristic not 2, for all integers k2. Moreover, we demonstrate that this method can also be applied to some nonbalanced bipartite graphs G when graphs G admit a weighted bi-adjacency matrix with orthogonal rows.

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