The Pop-stack-sorting Operator on Tamari Lattices

Abstract

Motivated by the pop-stack-sorting map on the symmetric groups, Defant defined an operator PopM : M M for each complete meet-semilattice M by PopM(x)=(\y∈ M: y x\ \x\). This paper concerns the dynamics of PopTamn, where Tamn is the n-th Tamari lattice. We say an element x∈ Tamn is t-Pop-sortable if PopMt (x) is the minimal element and we let ht(n) denote the number of t-Pop-sortable elements in Tamn. We find an explicit formula for the generating function Σn 1ht(n)zn and verify Defant's conjecture that it is rational. We furthermore prove that the size of the image of PopTamn is the Motzkin number Mn, settling a conjecture of Defant and Williams.