Pre-Lie Structures for Semisimple Lie Algebras
Abstract
We address the problem of admissibility of pre-Lie structures associated with a given Lie algebra, particularly, semisimple Lie algebras over C. Such structures are collectively referred to as Lie-admissible algebras, which are a class of nonassociative algebras such that the commutator bracket over these algebras satisfies the Jacobi identity. Among the five classes of nonassociative Lie-admissible algebras, left-symmetric algebras (LSAs) and right-symmetric algebras (RSAs), are known to be non-admissible by semisimple Lie algebras of finite dimension n ≥ 3. Here, we examine the remaining classes starting with those corresponding to the subgroup generated by permutations of order 2: (1 \; 3). These appear in the literature as anti-flexible algebras (AFAs). We discuss properties of AFAs and provide examples of finite-dimensional representations. AFAs geometrically correspond to richer structures than the flat torsion-free affine connections associated with left-symmetric algebras (LSAs) or right-symmetric algebras (RSAs). We compute Lie-admissibility criteria for AFAs and determine a few simple solution classes. Not surprisingly, solvable Lie algebras admit AFAs. Concerning semisimple ones, we report an explicit counterexample demonstrating an AFA admissible by sl(2, \, C). We then discuss the remaining two classes of nonassociative Lie-admissible algebras, the A3-associative and S3-associative types. Finally, we prove that S3-associative algebras are universal pre-Lie structures for any Lie algebra over C, including semisimple ones.
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