English

Representing Permutations with Few Moves

Combinatorics 2015-08-18 v1

Abstract

Consider a finite sequence of permutations of the elements 1,...,n, with the property that each element changes its position by at most 1 from any permutation to the next. We call such a sequence a tangle, and we define a move of element i to be a maximal subsequence of at least two consecutive permutations during which its positions form an arithmetic progression of common difference +1 or -1. We prove that for any initial and final permutations, there is a tangle connecting them in which each element makes at most 5 moves, and another in which the total number of moves is at most 4n. On the other hand, there exist permutations that require at least 3 moves for some element, and at least 2n-2 moves in total. If we further require that every pair of elements exchange positions at most once, then any two permutations can be connected by a tangle with at most O(log n) moves per element, but we do not know whether this can be reduced to O(1) per element, or to O(n) in total. A key tool is the introduction of certain restricted classes of tangle that perform pattern-avoiding permutations.

Keywords

Cite

@article{arxiv.1508.03674,
  title  = {Representing Permutations with Few Moves},
  author = {Sergey Bereg and Alexander E. Holroyd and Lev Nachmanson and Sergey Pupyrev},
  journal= {arXiv preprint arXiv:1508.03674},
  year   = {2015}
}
R2 v1 2026-06-22T10:34:16.677Z