O-Operators on Hom-Lie algebras

Abstract

O-operators (also known as relative Rota-Baxter operators) on Lie algebras have several applications in integrable systems and the classical Yang-Baxter equations. In this article, we study O-operators on hom-Lie algebras. We define cochain complex for O-operators on hom-Lie algebras with respect to a representation. Any O-operator induces a hom-pre-Lie algebra structure. We express the cochain complex of an O-operator in terms of certain hom-Lie algebra cochain complex of the sub-adjacent hom-Lie algebra associated with the induced hom-pre-Lie algebra. If the structure maps in a hom-Lie algebra and its representation are invertible, then we can extend the above cochain complex to a deformation complex for O-operators by adding the space of zero cochains. Subsequently, we study linear and formal deformations of O-operators on hom-Lie algebras in terms of the deformation cohomology. In the end, we deduce deformations of s-Rota-Baxter operators (of weight 0) and skew-symmetric r-matrices on hom-Lie algebras as particular cases of O-operators on hom-Lie algebras.