On the CFT Operator Spectrum at Large Global Charge

TL;DR

This paper computes the spectrum of operators with large global charge in certain 3D conformal field theories, revealing a universal structure and specific scaling behaviors for operator dimensions and excitations.

Contribution

It introduces a $1/J$ expansion approach to analyze large-charge sectors in strongly coupled 3D CFTs, deriving universal sum rules and explicit spectra for operators.

Findings

Large-$J$ operator spectrum controlled by a Goldstone boson effective Lagrangian.

Derived a universal sum rule for the lowest scalar operator dimensions at large $J$.

Identified the spectrum of low-lying excited states and their scaling behaviors.

Abstract

We calculate the anomalous dimensions of operators with large global charge $J$ in certain strongly coupled conformal field theories in three dimensions, such as the O(2) model and the supersymmetric fixed point with a single chiral superfield and a $W = \Phi^3$ superpotential. Working in a $1/J$ expansion, we find that the large-$J$ sector of both examples is controlled by a conformally invariant effective Lagrangian for a Goldstone boson of the global symmetry. For both these theories, we find that the lowest state with charge $J$ is always a scalar operator whose dimension $\Delta_J$ satisfies the sum rule $ J^2 \Delta_J - \left( \tfrac{J^2}{2} + \tfrac{J}{4} + \tfrac{3}{16} \right) \Delta_{J-1} - \left( \tfrac{J^2}{2} - \tfrac{J}{4} + \tfrac{3}{16} \right) \Delta_{J+1} = 0.035147 $ up to corrections that vanish at large $J$. The spectrum of low-lying excited states is also calculable explcitly: For example, the second-lowest primary operator has spin two and dimension $\Delta\ll J + \sqrt{3}$. In the supersymmetric case, the dimensions of all half-integer-spin operators lie above the dimensions of the integer-spin operators by a gap of order $J^{1/2}$. The propagation speeds of the Goldstone waves and heavy fermions are $\frac{1}{\sqrt{2}}$ and $\pm \frac{1}{2}$ times the speed of light, respectively. These values, including the negative one, are necessary for the consistent realization of the superconformal symmetry at large $J$.