Spanning path-cycle systems with given end-vertices in regular graphs (full version)
Combinatorics
2025-08-18 v1
Abstract
We prove the following theorem. Let be an integer, and be a -free -edge-connected -regular graph. Then, for every set of even number of vertices of such that the distance between any two vertices of in is at least 3, has vertex-disjoint paths and cycles such that (i) , (ii) each path connects two vertices of , and (iii) the set of the end-vertices of 's is equal to . A similar result for a 3-regular graph is obtained in [Graphs Combin. {\bf 39} (2023) \#85]. However, our proof is widely different from its proof.
Keywords
Cite
@article{arxiv.2508.11302,
title = {Spanning path-cycle systems with given end-vertices in regular graphs (full version)},
author = {Yoshimi Egawa and Mikio Kano and Kenta Ozeki},
journal= {arXiv preprint arXiv:2508.11302},
year = {2025}
}
Comments
19 pages, 9 figures