Distance spectral radius conditions for edge-disjoint spanning trees and a forest with constraints

Abstract

Let k 2 be a positive integer and let G be a simple graph of order n with minimum degree δ. A graph G is said to have property P(k, d) if it contains k edge-disjoint spanning trees and an additional forest F with edge number |E(F)| > d-1d(n-1), such that if F is not a spanning tree, then F has a component with at least d edges. Let D(G) be the distance matrix of G. We denote D(G) as the largest eigenvalue of D(G), which is called the distance spectral radius of G. In this paper, we investigate the relationship between the distance spectral radius and the property P(k, δ). We prove that for a connected graph G of order n 2k+8 with minimum degree δ k+2, if D(G) D(Kk-1 (Kn-k K1)), then G possesses property P(k, δ). Furthermore, for a connected balanced bipartite graph G of order n 4k+8 with minimum degree δ k+2, we show that if D(G) D(Kn2, n2 E(K1, n2-k+1)), then G also possesses property P(k, δ). Our results generalize the work of Fan et al. [Discrete Appl. Math. 376 (2025), 31--40] from the existence of k edge-disjoint spanning trees to the more refined structural property P(k, δ).