Fuss--Catalan algebras on generalized Dyck paths via non-crossing partitions
Abstract
We study the Fuss--Catalan algebras, which are generalizations of the Temperley--Lieb algebra and act on generalized Dyck paths, through non-crossing partitions. First, the Temperley--Lieb algebra is defined on non-crossing partitions, and a bijection between a Dyck path and a non-crossing partition is shown to be compatible with the Temperley--Lieb algebra on Dyck paths, or equivalently chord diagrams. We show that the Kreweras endomorphism on non-crossing partitions is equivalent to the rotation of chord diagrams under the bijection. Secondly, by considering an increasing $r$-chain in the graded lattice of non-crossing partitions, we define the Fuss--Catalan algebras on increasing $r$-chains. Through a bijection between an increasing $r$-chain and a generalized Dyck path, one naturally obtains the Fuss--Catalan algebra on generalized Dyck paths. As generalizations of the Fuss--Catalan algebra, we introduce the one- and two-boundary Fuss--Catalan algebras. Increasing $r$-chains of symmetric non-crossing partitions give symmetric generalized Dyck paths by the bijection, and the boundary Fuss--Catalan algebras naturally act on them. We show that these representations are compatible with the diagrammatic representations of the algebras by use of generalized chord diagrams. Thirdly, we discuss the integrability of the Fuss--Catalan algebras. For the Fuss--Catalan algebras with boundaries, we obtain a new solution of the reflection equation in the case of $r=2$.