Minimal Skew energy of oriented bicyclic graphs with a given diameter

Abstract

Let S(Gσ) be the skew-adjacency matrix of the oriented graph Gσ, which is obtained from a simple undirected graph G by assigning an orientation σ to each of its edges. The skew energy of an oriented graph Gσ is defined as the sum of absolute values of all eigenvalues of S(Gσ). For any positive integer d with 3≤ d≤ n-3, we determine the graph with minimal skew energy among all oriented bicyclic graphs that contain no vertex disjoint odd cycle of lengths s and l with s+l 2(mod 4) on n vertices with a given diameter d.