$J\bar{J}$-deformation as a Riemann bilinear dressing

TL;DR

This paper introduces a new way to understand $Jar{J}$-deformations in conformal field theories using Riemann bilinear identities, enabling calculations of partition functions, operator flows, and modular properties.

Contribution

It reformulates $Jar{J}$-deformations as a dressing on operators via Riemann bilinear identities, providing a unified framework for computing deformed correlators and spectra.

Findings

Derived deformation of partition functions on Riemann surfaces as kernel integrals.

Calculated the flow of conformal weights and charges under deformation.

Proposed criteria for constructing dressed operators based on modular transformations.

Abstract

We propose a reformulation of the conformal perturbation theory of the correlation functions in $J\bar{J}$-deformed CFTs as a dressing on the deformed operators, that matches both bare and renormalized perturbation theory. The key is to use the Riemann bilinear identity to convert the deformation into a dressing and a large-cycle integral for higher genus. Based on the proposal, we calculate the deformation of partition functions on the torus and higher genus Riemann surfaces, which can be written as kernel integrals that preserve modular invariance or covariance. We also calculate the flow of the conformal weights and conserved charges along the deformation. Based on this flow and the modular $S$-transformation, we propose a criterion for constructing dressed operators. We test our formalism and results by studying the $O(2, 2)$ theories and strings on the TsT background.