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A01=Robert McRae
A01=Shashank Kanade
A01=Thomas Creutzig
Age Group_Uncategorized
Age Group_Uncategorized
Author_Robert McRae
Author_Shashank Kanade
Author_Thomas Creutzig
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Category=PBF
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COP=United States
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Tensor Categories for Vertex Operator Superalgebra Extensions

Let V be a vertex operator algebra with a category C of (generalized) modules that has vertex tensor category structure, and thus braided tensor category structure, and let A be a vertex operator (super)algebra extension of V . We employ tensor categories to study untwisted (also called local) A-modules in C, using results of Huang-Kirillov-Lepowsky that show that A is a (super)algebra object in C and that generalized A-modules in C correspond exactly to local modules for the corresponding (super)algebra object. Both categories, of local modules for a C-algebra and (under suitable conditions) of generalized A-modules, have natural braided monoidal category structure, given in the first case by Pareigis and Kirillov-Ostrik and in the second case by Huang-Lepowsky-Zhang.

Our main result is that the Huang-Kirillov-Lepowsky isomorphism of categories between local (super)algebra modules and extended vertex operator (super)algebra modules is also an isomorphism of braided monoidal (super)categories. Using this result, we show that induction from a suitable subcategory of V -modules to Amodules is a vertex tensor functor. Two applications are given: First, we derive Verlinde formulae for regular vertex operator superalgebras and regular 1 2Z-graded vertex operator algebras by realizing them as (super)algebra objects in the vertex tensor categories of their even and Z-graded components, respectively. See more
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A01=Robert McRaeA01=Shashank KanadeA01=Thomas CreutzigAge Group_UncategorizedAuthor_Robert McRaeAuthor_Shashank KanadeAuthor_Thomas Creutzigautomatic-updateCategory1=Non-FictionCategory=PBFCategory=PBMWCOP=United StatesDelivery_Delivery within 10-20 working daysLanguage_EnglishPA=AvailablePrice_€50 to €100PS=Activesoftlaunch
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Product Details
  • Weight: 272g
  • Dimensions: 178 x 254mm
  • Publication Date: 31 May 2024
  • Publisher: American Mathematical Society
  • Publication City/Country: United States
  • Language: English
  • ISBN13: 9781470467241

About Robert McRaeShashank KanadeThomas Creutzig

Thomas Creutzig University of Alberta Edmonton Alberta Canada.Shashank Kanade University of Denver CO.Robert McRae Vanderbilt University Nashville TN.

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