English

Path Extendable Tournaments

Combinatorics 2025-05-01 v1

Abstract

A digraph DD is called \emph{path extendable} if for every nonhamiltonian (directed) path PP in DD, there exists another path PP^\prime with the same initial and terminal vertices as PP, and V(P)=V(P){w}V(P^\prime) = V (P)\cup \{w\} for a vertex wV(D)V(P)w \in V(D)\setminus V(P). Hence, path extendability implies paths of continuous lengths between every vertex pair. In earlier works of C. Thomassen and K. Zhang, it was shown that the condition of small i(T)i(T) or positive π2(T)\pi_2(T) implies paths of continuous lengths between every vertex pair in a tournament TT, where i(T)i(T) is the irregularity of TT and π2(T)\pi_2(T) denotes for the minimum number of paths of length 22 from uu to vv among all vertex pairs {u,v}\{u,v\}. Motivated by these results, we study sufficient conditions in terms of i(T)i(T) and π2(T)\pi_2(T) that guarantee a tournament TT is path extendable. We prove that (1) a tournament TT is path extendable if i(T)<2π2(T)(T+8)/6i(T)< 2\pi_2(T)-(|T|+8)/6, and (2) a tournament TT is path extendable if π2(T)>(7T10)/36\pi_2(T) > (7|T|-10)/36. As an application, we deduce that almost all random tournaments are path extendable.

Keywords

Cite

@article{arxiv.2504.21653,
  title  = {Path Extendable Tournaments},
  author = {Zan-Bo Zhang and Weihua He and Hajo Broersma and Xiaoyan Zhang},
  journal= {arXiv preprint arXiv:2504.21653},
  year   = {2025}
}

Comments

20 pages, 4 figures

R2 v1 2026-06-28T23:16:49.539Z