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Research PaperResearchia:202607.10079

Entanglement Wedge Reconstruction without Holographic Quantum Error Correction

Seiji Terashima

Abstract

Bulk reconstruction is a central problem in AdS/CFT, and entanglement wedge reconstruction is its subregion version. We argue that this subregion statement should be separated from the stronger holographic quantum error correction interpretation, in which one region-independent logical bulk operator has code-preserving representatives in several boundary regions. A simple locality argument shows that such a common reconstruction must commute with the code-preserving local algebras in the complem...

Submitted: July 10, 2026Subjects: Quantum Physics; Quantum Computing

Description / Details

Bulk reconstruction is a central problem in AdS/CFT, and entanglement wedge reconstruction is its subregion version. We argue that this subregion statement should be separated from the stronger holographic quantum error correction interpretation, in which one region-independent logical bulk operator has code-preserving representatives in several boundary regions. A simple locality argument shows that such a common reconstruction must commute with the code-preserving local algebras in the complementary regions. This is the mechanism realized in HaPPY-type codes: the erased regions are blind to a protected logical algebra. An ordinary finite NN holographic CFT does not have such a protected invisible sector for supergravity fields. Its low-energy local observables, in particular, suitably smeared stress tensors, detect the physical support and gravitational dressing of ordinary bulk operators, up to possible center or superselection data. Thus, there is no such holographic quantum error correction and the N=โˆžN=\infty agreement of global and subregion HKLL formulae is a free-theory statement. What remains is entanglement wedge reconstruction without holographic quantum error correction, or subregion complementarity: each boundary region has its own code-preserving low-energy algebra and its own region-adapted bulk interpretation, rather than a shared logical operator.


Source: arXiv:2607.08684v1 - http://arxiv.org/abs/2607.08684v1 PDF: https://arxiv.org/pdf/2607.08684v1 Original Link: http://arxiv.org/abs/2607.08684v1

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Date:
Jul 10, 2026
Topic:
Quantum Computing
Area:
Quantum Physics
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