English

The Pop-stack-sorting Operator on Tamari Lattices

Combinatorics 2023-02-07 v1

Abstract

Motivated by the pop-stack-sorting map on the symmetric groups, Defant defined an operator PopM:MM\mathsf{Pop}_M : M \to M for each complete meet-semilattice MM by PopM(x)=({yM:yx}{x}).\mathsf{Pop}_M(x)=\bigwedge(\{y\in M: y\lessdot x\}\cup \{x\}). This paper concerns the dynamics of PopTamn\mathsf{Pop}_{\mathrm{Tam}_n}, where Tamn\mathrm{Tam}_n is the nn-th Tamari lattice. We say an element xTamnx\in \mathrm{Tam}_n is tt-Pop\mathsf{Pop}-sortable if PopMt(x)\mathsf{Pop}_M^t (x) is the minimal element and we let ht(n)h_t(n) denote the number of tt-Pop\mathsf{Pop}-sortable elements in Tamn\mathrm{Tam}_n. We find an explicit formula for the generating function n1ht(n)zn\sum_{n\ge 1}h_t(n)z^n and verify Defant's conjecture that it is rational. We furthermore prove that the size of the image of PopTamn\mathsf{Pop}_{\mathrm{Tam}_n} is the Motzkin number MnM_n, settling a conjecture of Defant and Williams.

Cite

@article{arxiv.2201.10030,
  title  = {The Pop-stack-sorting Operator on Tamari Lattices},
  author = {Letong Hong},
  journal= {arXiv preprint arXiv:2201.10030},
  year   = {2023}
}

Comments

13 pages, 1 figure

R2 v1 2026-06-24T09:01:14.514Z