Acyclic sets in \(k\)-majority tournaments
The electronic journal of combinatorics, Tome 18 (2011) no. 1
When $\Pi$ is a set of $k$ linear orders on a ground set $X$, and $k$ is odd, the $k$-majority tournament generated by $\Pi$ has vertex set $X$ and has an edge from $u$ to $v$ if and only if a majority of the orders in $\Pi$ rank $u$ before $v$. Let $f_k(n)$ be the minimum, over all $k$-majority tournaments with $n$ vertices, of the maximum order of an induced transitive subtournament. We prove that $f_3(n)\ge\sqrt{n}$ always and that $f_3(n)\le 2\sqrt{n}-1$ when $n$ is a perfect square. We also prove that $f_5(n) \ge n^{1/4}$. For general $k$, we prove that $n^{c_k} \le f_k(n) \le n^{d_k(n)}$, where $c_k = 3^{-(k-1)/2}$ and $d_k(n)\to \frac{1+\lg\lg k}{-1+\lg k}$ as $n\to \infty$.
@article{10_37236_609,
author = {Kevin G. Milans and Daniel H. Schreiber and Douglas B. West},
title = {Acyclic sets in \(k\)-majority tournaments},
journal = {The electronic journal of combinatorics},
year = {2011},
volume = {18},
number = {1},
doi = {10.37236/609},
zbl = {1218.05062},
url = {http://geodesic.mathdoc.fr/articles/10.37236/609/}
}
Kevin G. Milans; Daniel H. Schreiber; Douglas B. West. Acyclic sets in \(k\)-majority tournaments. The electronic journal of combinatorics, Tome 18 (2011) no. 1. doi: 10.37236/609
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