English

On tournament inversion

Combinatorics 2023-12-05 v1

Abstract

An {\it inversion} of a tournament TT is obtained by reversing the direction of all edges with both endpoints in some set of vertices. Let invk(T){\rm inv}_k(T) be the minimum length of a sequence of inversions using sets of size at most kk that result in the transitive tournament. Let invk(n){\rm inv}_k(n) be the maximum of invk(T){\rm inv}_k(T) taken over nn-vertex tournaments. It is well-known that inv2(n)=(1+o(1))n2/4{\rm inv}_2(n)=(1+o(1))n^2/4 and it was recently proved by Alon et al. that inv(n):=invn(n)=n(1+o(1)){\rm inv}(n):={\rm inv}_{n}(n)=n(1+o(1)). In these two extreme cases (k=2k=2 and k=nk=n), random tournaments are asymptotically extremal objects. It is proved that the random tournament {\em does not} asymptotically attain invk(n){\rm inv}_k(n) when kk0k \ge k_0 and conjectured that inv3(n){\rm inv}_3(n) is (only) attained by (quasi) random tournaments. It is further proved that (1+o(1))inv3(n)/n2[112,0.0992)(1+o(1)){\rm inv}_3(n)/n^2 \in [\frac{1}{12}, 0.0992) and (1+o(1))invk(n)/n2[12k(k1)+δk,12k2/2ϵk](1+o(1)){\rm inv}_k(n)/n^2 \in [\frac{1}{2k(k-1)}+\delta_k, \frac{1}{2 \lfloor k^2/2 \rfloor}-\epsilon_k] where ϵk>0\epsilon_k > 0 for all k3k \ge 3 and δk>0\delta_k > 0 for all kk0k \ge k_0.

Keywords

Cite

@article{arxiv.2312.01910,
  title  = {On tournament inversion},
  author = {Raphael Yuster},
  journal= {arXiv preprint arXiv:2312.01910},
  year   = {2023}
}
R2 v1 2026-06-28T13:40:22.650Z