Hilbert Space and Defect Hilbert Spaces Associated with Categorical Symmetries

Abstract

We present a quantum mechanical approach to understanding the Hilbert space and the defect Hilbert spaces associated with line operators of BF theory combined with level-k Chern-Simons theory. The defect Hilbert spaces are closely related to the category of *-representations of the C*-algebra of the compactly supported sections of the Fell line bundle over the conjugation action groupoid G// Ad G, and the structure of this category and the groupoid action on the objects of this category is interpreted quantum mechanically. We show that the action of the line operators on the Hilbert space of the BF+kCS TQFT is given concretely by a convolution between the kernels that represent the line operators, and that the codimension-2 twist and the codimension-1 prequantum line bundle arise as two transgressions of the same universal level k∈ H4(BG,Z). For finite gauge group, the resulting convolution-eigenvalue formula is identified with the Verlinde formula for the (twisted) Drinfeld double Dω(G) via an explicit phase-by-phase match with the known finite modular data. For compact Lie group, the convolution-kernel eigenvalues coincide in the regular sector with the semiclassical Hopf-link S-kernel, identifying two complementary derivations of the same modular data.