English

Non-local modular flows across deformed null-cuts

High Energy Physics - Theory 2025-04-23 v3

Abstract

Modular flows probe important aspects of the entanglement structures, especially those of QFTs, in a dynamical framework. Despite the expected non-local nature in the general cases, the majority of explicitly understood examples feature local space-time trajectories under modular flows. In this work, we study a particular class of non-local modular flows. They are associated with the relativistic vacuum state and sub-regions whose boundaries lie on a planar null-surface. They satisfy a remarkable algebraic property known as the half-sided modular inclusion, and as a result the modular Hamiltonians are exactly known in terms of the stress tensor operators. To be explicit, we focus on the simplest QFT of a massive or massless free scalar in 2+12+1 dimensions. We obtain explicit expressions for the generators. They can be separated into a sum of local and non-local terms showing certain universal pattern. The preservation of von-Neumann algebra under modular flow works in a subtle way for the non-local terms. We derive a differential-integral equation for the finite modular flow, which can be analyzed in perturbation theory of small distance deviating from the entanglement boundary, and re-summation can be performed in appropriate limits. Comparison with the general expectation of modular flows in such limits are discussed.

Keywords

Cite

@article{arxiv.2501.02998,
  title  = {Non-local modular flows across deformed null-cuts},
  author = {Guan-Cheng Lu and Huajia Wang},
  journal= {arXiv preprint arXiv:2501.02998},
  year   = {2025}
}
R2 v1 2026-06-28T20:57:32.836Z