Algebraic structures defined on $m$-Dyck paths
Abstract
We introduce natural binary set-theoretical products on the set of all -Dyck paths, which led us to define a non-symmetric algebraic operad , described on the vector space spanned by -Dyck paths. Our construction is closely related to the -Tamari lattice, so the products defining are given by intervals in this lattice. For , we recover the notion of dendriform algebra introduced by J.-L. Loday in \cite{Lod}, and there exists a natural operad morphism from the operad of associative algebras into the operad , consequently is a Hopf operad. We give a description of the coproduct in terms of -Dyck paths in the last section. As an additional result, for any composition of with parts, we get a functor from the category of algebras into the category of algebras.
Keywords
Cite
@article{arxiv.1508.01252,
title = {Algebraic structures defined on $m$-Dyck paths},
author = {Daniel López N. and Louis-François Préville-Ratelle and María Ronco},
journal= {arXiv preprint arXiv:1508.01252},
year = {2018}
}
Comments
40 pages