2021
DOI: 10.48550/arxiv.2108.01898
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On rationality for $C_2$-cofinite vertex operator algebras

Abstract: Let V be an N-graded, simple, self-contragredient, C2-cofinite vertex operator algebra. We show that if the S-transformation of the character of V is a linear combination of characters of V -modules, then the category C of grading-restricted generalized V -modules is a rigid tensor category. We further show, without any assumption on the character of V but assuming that C is rigid, that C is a factorizable finite ribbon category, that is, a not-necessarily-semisimple modular tensor category. As a consequence, … Show more

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Cited by 4 publications
(8 citation statements)
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“…Since all the coefficient rational functions a n (z; λ, α 0 − λ, λ) in this theorem are analytic at z = 0, the differential equation has a regular singular point at z = 0. We will apply the theorem to Y λ 1 = Ω 0 (Y F λ ) and Y λ 2 = E λ to prove Theorem 5.2; we will also use the following result from the theory of ordinary differential equations (see for example [McR2, Appendix A] for a proof):…”
Section: The Rigidity Argumentmentioning
confidence: 99%
“…Since all the coefficient rational functions a n (z; λ, α 0 − λ, λ) in this theorem are analytic at z = 0, the differential equation has a regular singular point at z = 0. We will apply the theorem to Y λ 1 = Ω 0 (Y F λ ) and Y λ 2 = E λ to prove Theorem 5.2; we will also use the following result from the theory of ordinary differential equations (see for example [McR2, Appendix A] for a proof):…”
Section: The Rigidity Argumentmentioning
confidence: 99%
“…It follows from [Hu3] (see also the discussion in [CM,Section 3.1] and [McR3,Lemma 2.10]) that the category Rep(V ) of all grading-restricted generalized V -modules is a finite abelian category and a braided tensor category. In particular, if V is N-graded and C 2 -cofinite, then Rep(V ) is a finite braided ribbon category if and only if it is rigid.…”
Section: And Associativity Isomorphismsmentioning
confidence: 99%
“…Suppose a simple U -module M ∈ Ob(U ) has a projective cover p M : P M ։ M in U . It is not difficult to show that P M is singly-generated by any m ∈ P M \ Ker p M (see for example [McR3,Lemma 5.13]). That is, Ker p M is the unique maximal proper submodule of P M .…”
Section: 2mentioning
confidence: 99%
See 1 more Smart Citation
“…† The rationality of exceptional 𝑊-algebras has been recently proved in full generality by McRae[32].…”
mentioning
confidence: 99%