English

Two first-order logics of permutations

Combinatorics 2019-09-20 v2 Logic

Abstract

We consider two orthogonal points of view on finite permutations, seen as pairs of linear orders (corresponding to the usual one line representation of permutations as words) or seen as bijections (corresponding to the algebraic point of view). For each of them, we define a corresponding first-order logical theory, that we call TOTO\mathsf{TOTO} (Theory Of Two Orders) and TOOB\mathsf{TOOB} (Theory Of One Bijection) respectively. We consider various expressibility questions in these theories. Our main results go in three different direction. First, we prove that, for all k1k \ge 1, the set of kk-stack sortable permutations in the sense of West is expressible in TOTO\mathsf{TOTO}, and that a logical sentence describing this set can be obtained automatically. Previously, descriptions of this set were only known for k3k \le 3. Next, we characterize permutation classes inside which it is possible to express in TOTO\mathsf{TOTO} that some given points form a cycle. Lastly, we show that sets of permutations that can be described both in TOOB\mathsf{TOOB} and TOTO\mathsf{TOTO} are in some sense trivial. This gives a mathematical evidence that permutations-as-bijections and permutations-as-words are somewhat different objects.

Keywords

Cite

@article{arxiv.1808.05459,
  title  = {Two first-order logics of permutations},
  author = {Michael Albert and Mathilde Bouvel and Valentin Féray},
  journal= {arXiv preprint arXiv:1808.05459},
  year   = {2019}
}

Comments

v2: minor changes, following a referee report

R2 v1 2026-06-23T03:35:43.754Z