English

Enumerating Anchored Permutations with Bounded Gaps

Combinatorics 2019-09-11 v2

Abstract

Say that a permutation of 1,2,,n1,2,\ldots,n is \textit{kk-bounded} if every pair of consecutive entries in the permutation differs by no more than kk. Such a permutation is \textit{anchored} if the first entry is 11 and the last entry is nn. We show that the generating function for the enumeration of kk-bounded anchored permutations is always rational, mirroring the known result on (non-anchored) kk-bounded permutations due to Avgustinovich and Kitaev. We then explicitly determine the recursive formulas of minimal depth for the number of anchored kk-bounded permutations of nn for k=2k=2 and k=3k=3, resolving a conjecture listed on the Online Encyclopedia of Integer Sequences (entry A249665). We additionally show that the number of anchored kk-bounded permutations of nn is asymptotically O(kn)O\left(k^n\right) as a function of nn for a given kk.

Keywords

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

R2 v1 2026-06-23T03:30:03.946Z