Setting $T^2$ free for braneworld holography
Abstract
We identify what has been referred to as 'cut-off CFT' in holographic braneworld with or theory (depending on the dimension of the bulk), so that the holographic dual of AdS-gravity with Neumann boundary conditions is a -deformed CFT that is set free. After making statements that apply for general dimensions higher than three, we focus on the case of a three-dimensional bulk. We find from bulk arguments that the effective theory on the brane is governed by a -like flow equation, such that under certain assumptions the effective gravity theory on the brane is given by a -like deformed timelike Liouville theory, which limits to the description of the holographic Weyl anomaly for branes that approach the asymptotic boundary.
Keywords
Cite
@article{arxiv.2510.01099,
title = {Setting $T^2$ free for braneworld holography},
author = {Nele Callebaut and Matteo Selle},
journal= {arXiv preprint arXiv:2510.01099},
year = {2025}
}
Comments
v2: version accepted for publication in JHEP; comments and references added, typos corrected (38 pages + appendices, 3 figures)