Matching preclusion for [formula omitted]-grid graphs

Abstract

A matching preclusion set of a graph is an edge set whose deletion results in a graph without perfect matchings or almost perfect matchings. The Cartesian product of n paths is called an n-grid graph. In this paper, we study the matching preclusion problems for n-grid graphs and obtain the following results. If an n-grid graph has an even order, then it has the matching preclusion number n, and every optimal matching preclusion set is trivial except for the case of P2m□P3, the Cartesian product of a path on 2m vertices and a path on 3 vertices, when the nontrivial optimal matching preclusion sets are completely characterized. If the n-grid graph has an odd order, then it has the matching preclusion number n+1, and all the optimal matching preclusion sets are characterized.