Identities of the left-symmetric Witt algebras
Abstract
Let Pn=k[x1,x2,…,xn] be the polynomial algebra over a field k of characteristic zero in the variables x1,x2,…,xn and Ln be the left-symmetric Witt algebra of all derivations of Pn. We describe all right operator identities of Ln and prove that the set of all algebras Ln, where n≥ 1, generates the variety of all left-symmetric algebras. We also describe a class of general (not only right operator) identities for Ln.
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