The spectral radii and extremal graphs of two types of minimal graphs

Abstract

A connected nontrivial graph G is matching covered if every edge of G is contained in some perfect matching of G. A matching covered graph G is minimal if G-e is not matching covered for each edge e of G. A graph is said to be factor-critical if G-v has a perfect matching for every v∈ V(G). A factor-critical graph G is said to be minimal factor-critical if G-e is not factor-critical graph for each edge e∈ E(G). In this paper, by employing ear decomposition and edge-exchange techniques, the greatest spectral radii of minimal matching covered bipartite graphs and minimal factor-critical graphs are determined, and the corresponding extremal graphs are characterized.

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