Extremal distance spectral radius of graphs with h-extra r-component connectivity

Abstract

For two integers r≥ 2 and h≥ 0, the h-extra r-component connectivity of a graph G, denoted by crh, is defined as the minimum number of vertices whose removal produces a disconnected graph with at least r components, where each component contains at least h+1 vertices. Let Gn,δcrh represent the set of graphs of order n with minimum degree δ and h-extra r-component connectivity crh. Hu, Lin, and Zhang [Discrete Math. 345 (2025) 114621] investigated the case when h=0 within Gn,δcrh, and characterized the corresponding extremal graphs that minimize the distance spectral radius. In this paper, we further explore the relevant extremal graphs in Gn,δcrh for h≥ 1.