Mutual Information from Modular Flow in General CFTs
Abstract
The vacuum mutual information (MI) of subregion algebras provides a universal window into the data of general conformal field theories (CFTs). Exploiting the geometric nature of the modular flow associated to ball-shaped regions and the operator product expansion of twist operators implementing the replica symmetry in an -fold version of a CFT, it is possible to construct a hierarchy of increasingly refined approximations to the full MI. In this letter, we use the two-point functions of primaries of arbitrary spin in the replicated theory to constrain the twist operators, and find their contribution to the MI of arbitrarily boosted balls in any -dimensional CFT. When the two-point functions involve the primary with the lowest scaling dimension, our result provides the most precise approximation for the long-distance behavior of the MI, superseding all previous expansions. Building upon this result and certain universal properties of the short- and long-distance regimes, we put forward a new high-precision analytic approximation to the MI for arbitrary separations. The accuracy of our approach is validated against exact and lattice results. We further apply it to characterize the MI of a Maxwell field, a case for which no prior results are available.
Keywords
Cite
@article{arxiv.2604.19860,
title = {Mutual Information from Modular Flow in General CFTs},
author = {César A. Agón and Pablo Bueno and Adem Deniz Piskin and Guido van der Velde},
journal= {arXiv preprint arXiv:2604.19860},
year = {2026}
}
Comments
6 pages (+ Supplementary material), 1 figure