Construction and characterization of graphs whose each spanning tree has a perfect matching

Abstract

An edge subset S of a connected graph G is called an anti-Kekul\'e set if G-S is connected and has no perfect matching. We can see that a connected graph G has no anti-Kekul\'e set if and only if each spanning tree of G has a perfect matching. In this paper, by applying Tutte's 1-factor theorem and structure of minimally 2-connected graphs, we characterize all graphs whose each spanning tree has a perfect matching In addition, we show that if G is a connected graph of order 2n for a positive integer n≥ 4 and size m whose each spanning tree has a perfect matching, then m≤ (n+1)n 2, with equality if and only if G Kn K1.