Related papers: A framework for generalizing toric inequalities for holographic entanglement entropy

A framework for generalizing toric inequalities for holographic entanglement entropy

URL: http://arxiv.org/abs/2408.04741v2
Date: Tue, 12 Nov 2024 19:45:24 GMT
Title: A framework for generalizing toric inequalities for holographic entanglement entropy
Authors: Ning Bao, Keiichiro Furuya, Joydeep Naskar,
Abstract summary: We conjecture a generalization of the toric inequalities of citeCzech:2023xed. We then extend their proof methods for the generalized toric inequalities in two ways. The first extension constructs the graph corresponding to the toric inequalities and the generalized toric conjectures by tiling the Euclidean space. In the second extension, we exploit the cyclic nature of the inequalities and conjectures to construct cycle graphs.
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Abstract: We conjecture a multi-parameter generalization of the toric inequalities of \cite{Czech:2023xed}. We then extend their proof methods for the generalized toric inequalities in two ways. The first extension constructs the graph corresponding to the toric inequalities and the generalized toric conjectures by tiling the Euclidean space. An entanglement wedge nesting relation then determines the geometric structure of the tiles. In the second extension, we exploit the cyclic nature of the inequalities and conjectures to construct cycle graphs. Then, the graph can be obtained using graph Cartesian products of cycle graphs. In addition, we define a set of knots on the graph by following \cite{Czech:2023xed}. These graphs with knots then imply the validity of their associated inequality. We study the case where the graph can be decomposed into disjoint unions of torii. Under the specific case, we explore and prove the conjectures for some ranges of parameters. We also discuss ways to explore the conjectured inequalities whose corresponding geometries are $d$-dimensional torii $(d>2)$

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