Rowmotion on hook and two-row alt ν-Tamari lattices

Abstract

In 2024, Ceballos and Chenevière introduced alt ν-Tamari lattices, parameterized by a lattice path ν and an increment vector δ, as a common generalization of ν-Tamari and ν-Dyck lattices. We study rowmotion on two families: the alt hook-Tamari lattice Hδ(a,b) (where ν=ENa-1Eb-1N) and the alt 2-row-Tamari lattice Tδ(a,b) (where ν=EaNEbN). We explicitly determine the orbit structures of Hδ(a,b) and Tδ(a,b) under rowmotion, and prove that their orbit structures are independent of the increment vector δ. As a consequence, we show that rowmotion on Hδ(a,b) exhibits the cyclic sieving phenomenon. We also compute orbit sums for several natural statistics. In the hook case, we evaluate the down-degree, peak, valley, and area statistics; in the 2-row case, we focus on the down-degree statistic. All of these -- except for the area statistic -- are homometric under rowmotion. Regarding the methodology of this paper, our results in the hook case are obtained by applying a simple local modification to their Hasse diagrams. In the 2-row case, we introduce a switching property for semidistributive lattices, which allows us to compare the orbit structures arising from different increment vectors.