Spanning k-trees and distance spectral radius in graphs

Abstract

Let k≥2 be an integer. A tree T is called a k-tree if dT(v)≤ k for each v∈ V(T), that is, the maximum degree of a k-tree is at most k. Let λ1(D(G)) denote the distance spectral radius in G, where D(G) denotes the distance matrix of G. In this paper, we verify a upper bound for λ1(D(G)) in a connected graph G to guarantee the existence of a spanning k-tree in G.