Nonrenormalization Theorem for ${\cal N}=(4,4)$ Interface Entropy
Abstract
We derive a formula for the half-BPS interface entropy between any pair of theories on the same conformal manifold. This generalizes the diastasis formula derived in arXiv:1311.2202 for theories, which is restricted to the conformal submanifolds generated by either chiral or twisted chiral multiples of supersymmetry. To derive the formula, we use the fact that the conformal manifold of theories is symmetric and quaternionic-K\"ahler and that its isotropy group contains the external automorphism of the superconformal algebra. As an application of the formula, we prove a supersymmetric non-renormalization theorem, which explains the observation in arXiv:1005.4433 that the interface entropy for half-BPS Janus solutions in type IIB supergravity on coincides with the corresponding quantity in their free conformal field limits.
Cite
@article{arxiv.2502.06928,
title = {Nonrenormalization Theorem for ${\cal N}=(4,4)$ Interface Entropy},
author = {Andreas Karch and Hirosi Ooguri and Mianqi Wang},
journal= {arXiv preprint arXiv:2502.06928},
year = {2025}
}