On the K\"ahler-Hodge structure of superconformal manifolds

Abstract

We show that conformal manifolds in d≥ 3 conformal field theories with at least 4 supercharges are K\"ahler-Hodge, thus extending to 3d N=2 and 4d N=1 similar results previously derived for 4d N=2 and N=4 and various types of 2d SCFTs. Conformal manifolds in SCFTs are equipped with a holomorphic line bundle L, which encodes the operator mixing of supercharges under marginal deformations. Using conformal perturbation theory and superconformal Ward identities, we compute the curvature of L at a generic point on the conformal manifold. We show that the K\"ahler form of the Zamolodchikov metric is proportional to the first Chern class of L, with a constant of proportionality given by the two-point function coefficient of the stress tensor, CT. In cases where certain additional conditions about the nature of singular points on the conformal manifold hold, this implies a quantization condition for the total volume of the conformal manifold.

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