On growth rates of closed permutation classes
The electronic journal of combinatorics, Permutation Patterns, Tome 9 (2002) no. 2
A class of permutations $\Pi$ is called closed if $\pi\subset\sigma\in\Pi$ implies $\pi\in\Pi$, where the relation $\subset$ is the natural containment of permutations. Let $\Pi_n$ be the set of all permutations of $1,2,\dots,n$ belonging to $\Pi$. We investigate the counting functions $n\mapsto|\Pi_n|$ of closed classes. Our main result says that if $|\Pi_n| < 2^{n-1}$ for at least one $n\ge 1$, then there is a unique $k\ge 1$ such that $F_{n,k}\le |\Pi_n|\le F_{n,k}\cdot n^c$ holds for all $n\ge 1$ with a constant $c>0$. Here $F_{n,k}$ are the generalized Fibonacci numbers which grow like powers of the largest positive root of $x^k-x^{k-1}-\cdots-1$. We characterize also the constant and the polynomial growth of closed permutation classes and give two more results on these.
DOI :
10.37236/1682
Classification :
05A05, 05A16
Mots-clés : permutations, Stanley-Wilf conjecture, Fibonacci numbers
Mots-clés : permutations, Stanley-Wilf conjecture, Fibonacci numbers
@article{10_37236_1682,
author = {Tom\'a\v{s} Kaiser and Martin Klazar},
title = {On growth rates of closed permutation classes},
journal = {The electronic journal of combinatorics},
year = {2002},
volume = {9},
number = {2},
doi = {10.37236/1682},
zbl = {1015.05002},
url = {http://geodesic.mathdoc.fr/articles/10.37236/1682/}
}
Tomáš Kaiser; Martin Klazar. On growth rates of closed permutation classes. The electronic journal of combinatorics, Permutation Patterns, Tome 9 (2002) no. 2. doi: 10.37236/1682
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