Structural and Classification Theorems for Weyl-Type Algebras over Expolynomial Rings
Abstract
This paper introduces and systematically studies Weyl-type, Witt-type, and non-associative algebras defined over expolynomial rings -- commutative rings generated by exponential functions eα x, exponentials of exponentials e xp et, and power functions xα for α in an additive subgroup of a characteristic zero field . We establish several fundamental structural results: scalar extensions preserve both the algebraic structure and simplicity; intermediate subalgebras associated with subgroups ⊂eq ⊂eq remain simple; the algebra of graded derivations is isomorphic to a semidirect product e xp et,\; e x,\; x n; tensor products over disjoint variable sets decompose naturally into larger algebras; and a complete isomorphism criterion is given, showing that isomorphism depends precisely on the orbit of the parameter p under the automorphism group of and the equality of the deformation parameter t. These theorems generalize classical results on Weyl and Witt algebras, provide new families of simple algebras, and offer a foundation for further research in deformation theory, representation theory, and cohomology.
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