Modular Intersections, Time Interval Algebras and Emergent AdS$_2$
Abstract
We compute the modular flow and conjugation of time interval algebras of conformal Generalized Free Fields (GFF) in -dimensions in vacuum. For non-integer scaling dimensions, for general time-intervals, the modular conjugation and the modular flow of operators outside the algebra are non-geometric. This is because they involve a Generalized Hilbert Transform (GHT) that treats positive and negative frequency modes differently. However, the modular conjugation and flows viewed in the dual bulk AdS are local, because the GHT geometrizes as the local antipodal symmetry transformation that pushes operators behind the Poincar\'e horizon. These algebras of conformal GFF satisfy a and a property. We prove the converse statement that the existence of a (twisted) modular inclusion/intersection in any quantum system implies a representation of the (universal cover of) conformal group , respectively. We discuss the implications of our result for the emergence of Stringy AdS geometries in large theories without a large gap. Our result applied to higher dimensional eternal AdS black holes explains the emergence of two copies of on future and past Killing horizons.
Cite
@article{arxiv.2412.19882,
title = {Modular Intersections, Time Interval Algebras and Emergent AdS$_2$},
author = {Nima Lashkari and Kwing Lam Leung and Mudassir Moosa and Shoy Ouseph},
journal= {arXiv preprint arXiv:2412.19882},
year = {2025}
}
Comments
79 pages, 17 figures