A lattice of combinatorial Hopf algebras, Application to binary trees with multiplicities
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Publication:5746208
zbMath1294.05191arXiv1303.5538MaRDI QIDQ5746208
Publication date: 18 February 2014
Full work available at URL: https://arxiv.org/abs/1303.5538
monoidshook length formulabinary treesgenerating seriescombinatorial Hopf algebraspolynomial realization
Related Items (11)
The height of multiple edge plane trees ⋮ Representations and identities of plactic-like monoids ⋮ Brick polytopes, lattice quotients, and Hopf algebras ⋮ Finite basis problems for stalactic, taiga, sylvester and baxter monoids ⋮ Tropical representations and identities of the stylic monoid ⋮ Representations and identities of Baxter monoids with involution ⋮ Representations and identities of hypoplactic monoids with involution ⋮ Crystals and trees: quasi-Kashiwara operators, monoids of binary trees, and Robinson-Schensted-type correspondences ⋮ Permutrees ⋮ Combinatorics of cyclic shifts in plactic, hypoplactic, Sylvester, Baxter, and related monoids ⋮ Lumpings of algebraic Markov chains arise from subquotients
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