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On dualizability of braided tensor categories

Adrien Brochier, David Jordan, Noah Snyder

2021Compositio Mathematica36 citationsDOIOpen Access PDF

Abstract

We study the question of dualizability in higher Morita categories of locally presentable tensor categories and braided tensor categories. Our main results are that the 3-category of rigid tensor categories with enough compact projectives is 2-dualizable, that the 4-category of rigid braided tensor categories with enough compact projectives is 3-dualizable, and that (in characteristic zero) the 4-category of braided multi-fusion categories is 4-dualizable. Via the cobordism hypothesis, this produces respectively two-, three- and four-dimensional framed local topological field theories. In particular, we produce a framed three-dimensional local topological field theory attached to the category of representations of a quantum group at any value of $q$ .

Topics & Concepts

MathematicsPure mathematicsTensor (intrinsic definition)Field (mathematics)Tensor fieldCobordismEquivalence of categoriesAlgebra over a fieldGroup (periodic table)Closed categoryTopology (electrical circuits)Locally compact spaceTensor productCategory of groupsTensor contractionTopological quantum field theorySymmetric tensorTensor product of Hilbert spacesDerived categoryValue (mathematics)Algebraic structures and combinatorial modelsHomotopy and Cohomology in Algebraic TopologyBlack Holes and Theoretical Physics
On dualizability of braided tensor categories | Litcius