Generalized Level-Rank Duality, Holomorphic Conformal Field Theory, and Non-Invertible Anyon Condensation
Abstract
We study the interplay between holomorphic conformal field theory and dualities of 3D topological quantum field theories generalizing the paradigm of level-rank duality. A holomorphic conformal field theory with a Kac-Moody subalgebra implies a topological interface between Chern-Simons gauge theories. Upon condensing a suitable set of anyons, such an interface yields a duality between topological field theories. We illustrate this idea using the c=24 holomorphic theories classified by Schellekens, which leads to a list of novel sporadic dualities. Some of these dualities necessarily involve condensation of anyons with non-abelian statistics, i.e. gauging non-invertible one-form global symmetries. Several of the examples we discover generalize from c=24 to an infinite series. This includes the fact that Spin(n2)2 is dual to a twisted dihedral group gauge theory. Finally, if -1 is a quadratic residue modulo k, we deduce the existence of a sequence of holomorphic CFTs at central charge c=2(k-1) with fusion category symmetry given by Spin(k)2 or equivalently, the Z2-equivariantization of a Tambara-Yamagami fusion category.
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