Relative Invertibility and Full Dualizability of Finite Braided Tensor Categories

Abstract

Fix a finite symmetric tensor category E over an algebraically closed field. We derive an E-enriched version of Shimizu's characterizations of non-degeneracy for finite braided tensor categories. In order to do so, we consider, associated to any E-enriched finite braided tensor category A satisfying a mild technical assumption, a Hopf algebra FE/A in A. This is a generalization of Lyubashenko's universal Hopf algebra FA in A. In fact, we show that there is a short exact sequence FE→FA→FE/A of Hopf algebras in A, and that the canonical pairing on FA descends to a pairing ωE/A on FE/A. We prove that A is E-non-degenerate, i.e.\ its symmetric center is exactly E, if and only if the pairing ωE/A is non-degenerate. We then use the above characterization to show that an E-enriched finite braided tensor category is invertible in the Morita 4-category of E-enriched pre-tensor categories if and only if it is E-non-degenerate. As an application of our relative invertibility criterion, we extend the full dualizability result of Brochier-Jordan-Snyder by showing that a finite braided tensor category is fully dualizable as an object of the Morita 4-category of braided pre-tensor categories if its symmetric center is separable.