English

Tight Lower Bound for Pattern Avoidance Schur-Positivity

Combinatorics 2022-10-24 v1

Abstract

For a set of permutations (patterns) Π\Pi in SkS_k, consider the set of all permutations in SnS_n that avoid all patterns in Π\Pi. An important problem in current algebraic combinatorics is to find pattern sets Π\Pi such that the corresponding quasi-symmetric function is symmetric for all nn. Recently, Bloom and Sagan proved that for any k4k \ge 4, the size of such Π\Pi must be at least 33 unless Π{[1,2,,k],  [k,,1]}\Pi \subseteq \{[1, 2, \dots, k],\; [k, \dots, 1]\}, and asked for a general lower bound. We prove that the minimal size of such Π\Pi is exactly k1k - 1. The proof applies a new generalization of a theorem of Bose from extremal combinatorics. This generalization is proved using the multilinear polynomial approach of Alon, Babai and Suzuki to the extension by Ray-Chaudhuri and Wilson to Bose's theorem.

Keywords

Cite

@article{arxiv.2210.11858,
  title  = {Tight Lower Bound for Pattern Avoidance Schur-Positivity},
  author = {Avichai Marmor},
  journal= {arXiv preprint arXiv:2210.11858},
  year   = {2022}
}
R2 v1 2026-06-28T04:10:02.170Z