Nonassociative algebras of anti-biderivation-type

Abstract

The main purpose of this paper is to study the class of Jacobi-Jordan-admissible algebras, such that its product is an anti-biderivation of the related Jacobi-Jordan algebra. We called it as A BD-algebras. First, we provide characterizations of algebras in this class. Furthermore, we show that this class of nonassociative algebras includes Jacobi-Jordan algebras, symmetric anti-Leibniz algebras, and anti- LR-algebras. In particular, we proved that anti- LR-algebras under the commutator product give s4-algebras, which were recently introduced by Filippov and Dzhumadildaev. In addition, we then study Aflexible A BD-algebras. Then, we introduce the post-Jacobi-Jordan structures on Jacobi-Jordan algebras and establish results that each Jacobi-Jordan algebra admits a non-trivial post-Jacobi-Jordan structure. At the end of the paper, we give the algebraic classification of complex 3-dimensional A BD-algebras.