Litcius/Paper detail

Post-Hopf algebras, relative Rota–Baxter operators and solutions to the Yang–Baxter equation

Yunnan Li, Yunhe Sheng, Rong Tang

2023Journal of Noncommutative Geometry20 citationsDOIOpen Access PDF

Abstract

In this paper, first, we introduce the notion of post-Hopf algebra, which gives rise to a post-Lie algebra on the space of primitive elements and the fact that there is naturally a post-Hopf algebra structure on the universal enveloping algebra of a post-Lie algebra. A novel property is that a cocommutative post-Hopf algebra gives rise to a generalized Grossman–Larson product, which leads to a subadjacent Hopf algebra and can be used to construct solutions to the Yang–Baxter equation. Then, we introduce the notion of relative Rota–Baxter operator on Hopf algebras. A cocommutative post-Hopf algebra gives rise to a relative Rota–Baxter operator on its subadjacent Hopf algebra. Conversely, a relative Rota–Baxter operator also induces a post-Hopf algebra. Finally, we show that relative Rota–Baxter operators give rise to matched pairs of Hopf algebras. Consequently, post-Hopf algebras and relative Rota–Baxter operators give solutions to the Yang–Baxter equation in certain cocommutative Hopf algebras.

Topics & Concepts

Hopf algebraMathematicsUniversal enveloping algebraRepresentation theory of Hopf algebrasPure mathematicsQuantum groupQuasitriangular Hopf algebraAlgebra over a fieldFiltered algebraDivision algebraAdvanced Topics in AlgebraAlgebraic structures and combinatorial modelsMatrix Theory and Algorithms