Rational RG flow, extension, and Witt class

Abstract

Consider a renormalization group flow preserving a pre-modular fusion category S1. If it flows to a rational conformal field theory, the surviving symmetry S1 flows to a pre-modular fusion category S2 with monoidal functor F: S1 S2. By clarifying mathematical (especially category theoretical) meaning of renormalization group domain wall/interface or boundary condition, we find the hidden extended vertex operator (super)algebra gives a unique (up to braided equivalence) completely ( S1 S2)'-anisotropic representative of the Witt equivalence class [ S1 S2]. The mathematical conjecture is supported physically, and passes various tests in concrete examples including non/unitary minimal models, and Wess-Zumino-Witten models. In particular, the conjecture holds beyond diagonal cosets. The picture also establishes the conjectured half-integer condition, which fixes infrared conformal dimensions mod 12. It further leads to the double braiding relation, namely braiding structures jump at conformal fixed points. As an application, we solve the flow from the E-type minimal model (A10,E6) M(4,3).

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