Tensor structure on the module category of the triplet superalgebra SW(m)
Abstract
We discuss the tensor structure on the category of modules of the N=1 triplet vertex operator superalgebra SW(m) introduced by Adamovi\'c and Milas. Based on the theory of vertex tensor supercategories, we determine the structure of fusion products between the simple and projective SW(m)-modules and show that the tensor supercategory on SW(m)-mod is rigid. Technically, explicit solutions of a fourth-order Fuchsian differential equation are important to show the rigidity of SW(m)-modules. We construct solutions of this Fuchsian differential equation using the theory of the Dotsenko-Fateev integrals developed by Sussman.
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