Reduced typed angularly decorated planar rooted trees and generalized tridendriform algebras
Abstract
We introduce a generalization of tridendriform algebras, where each of the three products are replaced by a family of products indexed by a set . We study the needed structure on for free -tridendriform algebras to be built on Schr\"oder trees (as it is the case in the classical case), with convenient decorations on their leaves. We obtain in this way extended triassociative semigroups. We describe commutative -tridendriform algebras in terms of typed words. We also study links with generalizations of Rota-Baxter algebras and describe the Koszul duals of the corresponding operads.
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