Tricyclic graphs for which the second largest distance eigenvalue less than -12

Abstract

Let G be a simple connected graph with vertex set V(G)=\v1, v2, …, vn\. The distance dG(vi,vj) between two vertices vi and vj of G is the length of a shortest path between vi and vj. The distance matrix of G is defined as D(G)=(dG(vi,vj))n× n. The second largest distance eigenvalue of \( G \) is the second largest eigenvalues of D(G). Guo and Zhou [Discrete Math. 347(2024), 114082] proved that any connected graph with the second largest distance eigenvalue less than -12 is chordal, and characterize all bicyclic graphs and split graphs with the second largest distance eigenvalue less than -12. Based on this, we characterize all tricyclic graphs with the second largest distance eigenvalue less than -12.