Lie Rota--Baxter operators on the Sweedler algebra H4

Abstract

If A is an associative algebra, then we can define the adjoint Lie algebra A(-) and Jordan algebra A(+). It is easy to see that any associative Rota--Baxter operator on A induces a Lie and Jordan Rota--Baxter operator on A(-) and A(+) respectively. Are there Lie (Jordan) Rota--Baxter operators, which are not associative Rota--Baxter operators? In the present article we are studying these questions for the Sweedler algebra H4, that is a 4-dimension non-commutative Hopf algebra. More precisely, we describe the Rota--Baxter operators on Lie algebra on the adjoint Lie algebra H4(-).

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