Enumerating Anchored Permutations with Bounded Gaps
Abstract
Say that a permutation of is \textit{-bounded} if every pair of consecutive entries in the permutation differs by no more than . Such a permutation is \textit{anchored} if the first entry is and the last entry is . We show that the generating function for the enumeration of -bounded anchored permutations is always rational, mirroring the known result on (non-anchored) -bounded permutations due to Avgustinovich and Kitaev. We then explicitly determine the recursive formulas of minimal depth for the number of anchored -bounded permutations of for and , resolving a conjecture listed on the Online Encyclopedia of Integer Sequences (entry A249665). We additionally show that the number of anchored -bounded permutations of is asymptotically as a function of for a given .
Cite
@article{arxiv.1808.03573,
title = {Enumerating Anchored Permutations with Bounded Gaps},
author = {Maria M. Gillespie and Kenneth G. Monks and Kenneth M. Monks},
journal= {arXiv preprint arXiv:1808.03573},
year = {2019}
}
Comments
This is an updated version including two new results: the rationality of the generating function for all k, and asymptotic bounds on the number of k-bounded permutations of n