On the structure of split regular Hom-Lie Rinehart algebras
Abstract
The aim of this paper is to study the structures of split regular Hom-Lie Rinehart algebras. Let (L,A) be a split regular Hom-Lie Rinehart algebra. We first show that L is of the form L=U+Σ[γ]∈/I[γ] with U a vector space complement in H and I[γ] are well described ideals of L satisfying I[γ],I[δ]=0 if I[γ]≠ I[δ]. Also, we discuss the weight spaces and decompositions of A and present the relation between the decompositions of L and A. Finally, we consider the structures of tight split regular Hom-Lie Rinehart algebras.
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