Constrained HRT Surfaces and their Entropic Interpretation
Abstract
Consider two boundary subregions and that lie in a common boundary Cauchy surface, and consider also the associated HRT surface for . In that context, the constrained HRT surface can be defined as the codimension-2 bulk surface anchored to that is obtained by a maximin construction restricted to Cauchy slices containing . As a result, is the union of two pieces, and lying respectively in the entanglement wedges of and its complement . Unlike the area of the HRT surface , at least in the semiclassical limit, the area of commutes with the area of . To study the entropic interpretation of , we analyze the R\'enyi entropies of subregion in a fixed-area state of subregion . We use the gravitational path integral to show that the R\'enyi entropies are then computed by minimizing over spacetimes defined by a boost angle conjugate to . In the case where the pieces and intersect at a constant boost angle, a geometric argument shows that the R\'enyi entropy is then given by . We discuss how the R\'enyi entropy differs from the von Neumann entropy due to a lack of commutativity of the and limits. We also discuss how the behaviour changes as a function of the width of the fixed-area state. Our results are relevant to some of the issues associated with attempts to use standard random tensor networks to describe time dependent geometries.
Keywords
Cite
@article{arxiv.2311.18290,
title = {Constrained HRT Surfaces and their Entropic Interpretation},
author = {Xi Dong and Donald Marolf and Pratik Rath},
journal= {arXiv preprint arXiv:2311.18290},
year = {2024}
}
Comments
16 pages, 3 figures, minor edits in v2