On rationality of C-graded vertex algebras and applications to Weyl vertex algebras under conformal flow
Abstract
Using the Zhu algebra for a certain category of C-graded vertex algebras V, we prove that if V is finitely -generated and satisfies suitable grading conditions, then V is rational, i.e. has semi-simple representation theory, with one dimensional level zero Zhu algebra. Here denotes the vectors in V that are annihilated by lowering the real part of the grading. We apply our result to the family of rank one Weyl vertex algebras with conformal element ωμ parameterized by μ ∈ C, and prove that for certain non-integer values of μ, these vertex algebras, which are non-integer graded, are rational, with one dimensional level zero Zhu algebra. In addition, we generalize this result to appropriate C-graded Weyl vertex algebras of arbitrary ranks.
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