Graphs with Diameter n-e Minimizing the Spectral Radius

Abstract

The spectral radius (G) of a graph G is the largest eigenvalue of its adjacency matrix A(G). For a fixed integer e 1, let Gminn,n-e be a graph with minimal spectral radius among all connected graphs on n vertices with diameter n-e. Let Pn1,n2,...,nt,pm1,m2,...,mt be a tree obtained from a path of p vertices (0 1 2 ... (p-1)) by linking one pendant path Pni at mi for each i∈\1,2,...,t\. For e=1,2,3,4,5, Gminn,n-e were determined in the literature. Cioaba-van Dam-Koolen-Lee CDK conjectured for fixed e≥ 6, Gminn,n-e is in the family Pn,e=\P2,1,...1,2,n-e+12,m2,...,me-4,n-e-2 2<m2<...<me-4<n-e-2\. For e=6,7, they conjectured Gminn,n-6=P2,D-12,D-22,1,2,n-5 and Gminn,n-7=P2,D+23,D- D+23, D-22,1,1,2,n-6. In this paper, we settle their three conjectures positively. We also determine Gminn,n-8 in this paper.