Self-duality under gauging a non-invertible symmetry

Abstract

We discuss two-dimensional conformal field theories (CFTs) which are invariant under gauging a non-invertible global symmetry. At every point on the orbifold branch of c=1 CFTs, it is known that the theory is self-dual under gauging a Z2× Z2 symmetry, and has Rep(H8) and Rep(D8) fusion category symmetries as a result. We find that gauging the entire Rep(H8) fusion category symmetry maps the orbifold theory at radius R to that at radius 2/R. At R=2, which corresponds to two decoupled Ising CFTs (Ising2 in short), the theory is self-dual under gauging the Rep(H8) symmetry. This implies the existence of a topological defect line in the Ising2 CFT obtained from half-space gauging of the Rep(H8) symmetry, which commutes with the c=1 Virasoro algebra but does not preserve the fully extended chiral algebra. We bootstrap its action on the c=1 Virasoro primary operators, and find that there are no relevant or marginal operators preserving it. Mathematically, the new topological line combines with the Rep(H8) symmetry to form a bigger fusion category which is a Z2-extension of Rep(H8). We solve the pentagon equations including the additional topological line and find 8 solutions, where two of them are realized in the Ising2 CFT. Finally, we show that the torus partition functions of the Monster2 CFT and Ising×Monster CFT are also invariant under gauging the Rep(H8) symmetry.

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