On the minimal energy of conjugated unicyclic graphs with maximum degree at most 3

Abstract

The energy of a graph G, denoted by E(G), is defined as the sum of the absolute values of all eigenvalues of G. Let n be an even number and Un be the set of all conjugated unicyclic graphs of order n with maximum degree at most 3. Let Snn2 be the radialene graph obtained by attaching a pendant edge to each vertex of the cycle Cn2. In [Y. Cao et al., On the minimal energy of unicyclic H\"uckel molecular graphs possessing Kekul\'e structures, Discrete Appl. Math. 157 (5) (2009), 913--919], Cao et al. showed that if n≥ 8, Snn2 G∈ Un and the girth of G is not divisible by 4, then E(G)>E(Snn2). Let An be the unicyclic graph obtained by attaching a 4-cycle to one of the two leaf vertices of the path Pn2-1 and a pendent edge to each other vertices of Pn2-1. In this paper, we prove that An is the unique unicyclic graph in Un with minimal energy.