Double constructions of Heisenberg Frobenius algebras and Connes cocycles, and solutions of the three-dimensional associative Yang-Baxter equation

TL;DR

This paper explores solutions to the associative Yang-Baxter equation within a specific 3D algebra related to the Heisenberg algebra, constructing Frobenius algebras, Connes cocycles, and dendriform structures.

Contribution

It explicitly determines solutions to the associative Yang-Baxter equation in a 3D algebra and constructs related Frobenius algebras, Connes cocycles, and dendriform structures.

Findings

Explicit solutions to the associative Yang-Baxter equation in H.

Construction of Frobenius algebras and Connes cocycles from solutions.

Development of compatible dendriform algebras and solutions of D-equations.

Abstract

We consider the three-dimensional associative algebra H consisting of the 3x3 strictly upper triangular matrices whose the commutator is the Heisenberg Lie algebra. We determine the solutions of the Yang-Baxter associative equation in H. For the antisymmetric solutions, the corresponding bialgebraic structures, double constructions of Frobenius algebras and properties are given explicitly.Besides, we determine some related compatible dendriform algebras and solutions of their D-equations. Using symmetric solutions of these equations, we build the double constructions of related Connes cocycles. Finally, we compute solutions of the three-dimensional non decomposable associative Yang-Baxter equation and build the double constructions of associated Frobenius algebras.