Multipliers, W-algebras and the growth of generalized polynomial identities
Abstract
Let A be a W-algebra over a field F of characteristic zero, where W is any F-algebra. We first develop a comprehensive theory of generalized identities independent of the algebraic structure of W, using the multiplier algebra of A. Then, we investigate the generalized variety generated by the k× k matrix algebra with a suitable action, proving that it exhibits almost polynomial growth of the generalized codimensions. Furthermore, we characterize the generalized varieties of almost polynomial growth generated by finite dimensional W-algebras. Finally, we provide a counterexample to the Specht property of generalized TW-ideals in characteristic zero.
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