Your search keyword '"17B69, 17B67, 17B68, 18A30, 18M15, 81T40"' showing total 2 results

1. Direct limit completions of vertex tensor categories

Author

Creutzig, Thomas, McRae, Robert, and Yang, Jinwei

Subjects

Mathematics - Quantum Algebra, Mathematical Physics, Mathematics - Category Theory, Mathematics - Representation Theory, 17B69, 17B67, 17B68, 18A30, 18M15, 81T40

Abstract

We show that direct limit completions of vertex tensor categories inherit vertex and braided tensor category structures, under conditions that hold for example for all known Virasoro and affine Lie algebra tensor categories. A consequence is that the theory of vertex operator (super)algebra extensions also applies to infinite-order extensions. As an application, we relate rigid and non-degenerate vertex tensor categories of certain modules for both the affine vertex superalgebra of $\mathfrak{osp}(1|2)$ and the $N=1$ super Virasoro algebra to categories of Virasoro algebra modules via certain cosets., Comment: 51 pages; in this version, Theorem 7.1 is improved by removing one of the conditions needed to apply it; corresponding improvements are made to the subsequent examples; final version to appear in Communications in Contemporary Mathematics

Published

2020

2. Direct limit completions of vertex tensor categories

Author

Robert McRae, Thomas Creutzig, and Jinwei Yang

Subjects

Vertex (graph theory), Applied Mathematics, General Mathematics, FOS: Physical sciences, Mathematics - Category Theory, Super Virasoro algebra, Mathematical Physics (math-ph), Direct limit, Combinatorics, High Energy Physics::Theory, Mathematics::Quantum Algebra, Mathematics::Category Theory, Tensor (intrinsic definition), Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Category Theory (math.CT), Affine transformation, Representation Theory (math.RT), Mathematics::Representation Theory, 17B69, 17B67, 17B68, 18A30, 18M15, 81T40, Mathematical Physics, Mathematics - Representation Theory, Mathematics

Abstract

We show that direct limit completions of vertex tensor categories inherit vertex and braided tensor category structures, under conditions that hold for example for all known Virasoro and affine Lie algebra tensor categories. A consequence is that the theory of vertex operator (super)algebra extensions also applies to infinite-order extensions. As an application, we relate rigid and non-degenerate vertex tensor categories of certain modules for both the affine vertex superalgebra of $\mathfrak{osp}(1|2)$ and the $N=1$ super Virasoro algebra to categories of Virasoro algebra modules via certain cosets., Comment: 51 pages; in this version, Theorem 7.1 is improved by removing one of the conditions needed to apply it; corresponding improvements are made to the subsequent examples; final version to appear in Communications in Contemporary Mathematics

Published

2021