TL;DR
This paper investigates quasi-lisse vertex (super)algebras, establishing new finiteness conditions that ensure the convergence of genus-zero and genus-one n-point correlation functions, advancing understanding in algebraic and conformal field theory.
Contribution
It introduces novel finiteness conditions for quasi-lisse vertex (super)algebras, enhancing the theoretical framework for correlation function convergence.
Findings
Established new finiteness conditions for quasi-lisse vertex (super)algebras.
Proved convergence of genus-zero and genus-one n-point correlation functions under these conditions.
Extended the mathematical understanding of vertex (super)algebra structures.
Abstract
We study quasi-lisse vertex (super)algebras and establish new finiteness conditions for the convergence of genus-zero and genus-one -point correlation functions.
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Taxonomy
TopicsAdvanced Topics in Algebra · Algebraic structures and combinatorial models · Rings, Modules, and Algebras