Rota-Baxter operators on ω-Lie algebras

Abstract

This article explores Rota-Baxter operators on finite-dimensional ω-Lie algebras over a field of characteristic not 2. We provide several methods for constructing left-symmetric algebras, ω-Lie algebras, and Hom-Lie algebras via compatible Rota-Baxter operators on a given ω-Lie algebra. We also study the geometric structures of compatible Rota-Baxter operators of weight 0 and isometric Rota-Baxter operators of weight 1 over the field of complex numbers. In particular, we prove that the affine variety of all isometric Rota-Baxter operators of weight 1 on any finite-dimensional non-Lie complex simple ω-Lie algebra is 1-dimensional. Furthermore, we show that for every 4-dimensional non-Lie complex ω-Lie algebra, there always exists a nilpotent compatible Rota-Baxter operator of weight 0 such that the induced Hom-Lie algebra is nonabelian but solvable.