Simple finite-dimensional double algebras
Abstract
A double algebra is a linear space equipped with linear map . Additional conditions on this map lead to the notions of Lie and associative double algebras. We prove that simple finite-dimensional Lie double algebras do not exist over an arbitrary field, and all simple finite-dimensional associative double algebras over an algebraically closed field are trivial. Over an arbitrary field, every simple finite-dimensional associative double algebra is commutative. A double algebra structure on a finite-dimensional space is naturally described by a linear operator on the algebra of linear transformations of~. Double Lie algebras correspond in this sense to skew-symmetric Rota---Baxter operators, double associative algebra structures---to (left) averaging operators.
Cite
@article{arxiv.1611.01992,
title = {Simple finite-dimensional double algebras},
author = {M. E. Goncharov and P. S. Kolesnikov},
journal= {arXiv preprint arXiv:1611.01992},
year = {2018}
}