Connectivity preserving spanning (u,v)-paths in k-connected graphs

Abstract

Hasunuma [Graphs Combin. 41:10 (2025)] proved that for k 2, there exists a function f(k)=O(k) such that every k-connected graph G of order n f(k) with δ(G) n2 contains a Hamiltonian cycle H such that G-E(H) is k-connected. In this paper, we show that for k 2, if G is a k-connected graph of order n 6k+6 with minimum degree at least n+12, then for any two distinct vertices u,v∈ V(G), there exists a Hamiltonian (u,v)-path P such that G-E(P) is k-connected. Moreover, we further extend this result to s internally disjoint spanning (u,v)-paths.