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Regularity of fixed-point vertex operator subalgebras
Scott Carnahan,Masahiko Miyamoto +1 more
TLDR
In this paper, it was shown that the fixed-point vertex operator subalgebra (T^\sigma) is regular under the action of any finite solvable group, and that the twisted twining characters for commuting finite order automorphisms of holomorphic vertex operator algebras are also regular.Abstract:
We show that if $T$ is a simple non-negatively graded regular vertex operator algebra with a nonsingular invariant bilinear form and $\sigma$ is a finite order automorphism of $T$, then the fixed-point vertex operator subalgebra $T^\sigma$ is also regular. This yields regularity for fixed point vertex operator subalgebras under the action of any finite solvable group. As an application, we obtain an $SL_2(\mathbb{Z})$-compatibility between twisted twining characters for commuting finite order automorphisms of holomorphic vertex operator algebras. This resolves one of the principal claims in the Generalized Moonshine conjecture.read more
Citations
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Much ado about Mathieu
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Schur–weyl duality for heisenberg cosets
TL;DR: In this article, a Schur-Weyl type duality for both simple and reducible modules is proven for vertex tensor categories in the sense of Huang, Lepowsky and Zhang, and families of vertex algebra extensions of C are found and every simple C-module is contained in at least one V-module.
References
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Twisted representations of vertex operator algebras
TL;DR: In this paper, the relation between the g-twisted V-modules and Ag(V)-modules is established, and it is proved that if V is g-rational, then Ag (V) is finite-dimensional semi-simple associative algebra and there are only finitely many irreducible g-two-stuck Vmodules.
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Modular invariance of vertex operator algebras satisfying C 2 -cofiniteness
TL;DR: In this article, a trace function of modules for vertex operator algebras (VOA) satisfying C2 -cofiniteness is investigated, and it is shown that the space spanned by such pseudotrace functions has a modular invariance property.
Book ChapterDOI
Logarithmic Tensor Category Theory for Generalized Modules for a Conformal Vertex Algebra, I: Introduction and Strongly Graded Algebras and their Generalized Modules
TL;DR: The tensor category theory for modules for vertex operator algebras was introduced and developed in this paper, where the module categories are not semisimple and accommodate modules with generalized weight spaces.
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Beauty and the Beast: Superconformal Symmetry in a Monster Module
TL;DR: Frenkel, Lepowsky, and Meurman as mentioned in this paper constructed a representation of the largest sporadic simple finite group, the Fischer-Griess monster, as the automorphism group of the operator product algebra of a conformal field theory with central chargec=24.
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Some Finiteness Properties of Regular Vertex Operator Algebras
TL;DR: In this paper, a natural extension of the notion of the contragredient module for vertex operator algebras is given, and Zhu's C 2 -finiteness condition holds, fusion rules (for any three irreducible modules) are finite and the vertex operator algebra themselves are finitely generated.