Factorizations, classifying complements problem and deformation maps for Lie-Yamaguti algebras

Abstract

A Lie-Yamaguti algebra is a non-associative algebraic structure that generalizes both Lie algebras and Lie triple systems. We first consider the factorization problem for Lie-Yamaguti algebras that essentially related to the bicrossed product of Lie-Yamaguti algebras. Next, given an inclusion g ⊂ E of Lie-Yamaguti algebras and a strong g-complement h, we describe and classify all g-complements in E. In particular, we show that any other g-complement in E is isomorphic to h by some deformation map r: h → g. Despite this importance, it turns out that a deformation map generalizes homomorphisms, derivations, crossed homomorphisms and relative Rota-Baxter operators on Lie-Yamaguti algebras. We define the cohomology of a deformation map unifying the cohomologies of all the operators mentioned above. Finally, we provide a Maurer-Cartan characterization and construct the governing L∞-algebra of a deformation map r that controls the linear deformations of r.