Add to ORKGIn the context of quantum theories of spacetime, one overarching question is how quantum information in the bulk spacetime is encoded holographically in boundary degrees of freedom. It is particularly interesting to understand the correspondence between bulk subregions and boundary subregions in order to address the emergence of locality in the bulk quantum spacetime. For the AdS/CFT correspondence, it is known that this bulk information is encoded redundantly on the boundary in the form of an error-correcting code. Having access only to a subregion of the boundary is as if part of the holographic code has been damaged by noise and rendered inaccessible. In quantum-information science, the problem of recovering information from a damaged co...
We examine how to construct a spatial manifold and its geometry from the entanglement structure of a...
According to the AdS/CFT correspondence, the geometries of certain spacetimes are fully determined b...
The Ryu–Takayanagi and Hubeny–Rangamani–Takayanagi formulae suggest that bulk geometry emerges from ...
In the context of quantum theories of spacetime, one overarching question is how quantum information...
At the heart of recent progress in AdS/CFT is the question of subregion duality, or entanglement wed...
In this work, we show the robustness of uberholography and its associated quantum error correcting c...
We introduce a new algebraic framework for understanding nonperturbative gravitational aspects of bu...
We show that complementary state-specific reconstruction of logical (bulk) operators is equivalent t...
In the holographic correspondence, subregion duality posits that knowledge of the mixed state of a f...
We give a general construction of a setup that verifies bulk reconstruction, conservation of relativ...
The recent proposal of Almheiri et al.[http://arxiv.org/abs/1411.7041], together with the Ryu-Takaya...
Most of the literature in the bulk reconstruction program in holography focuses on recovering local ...
We revisit entanglement wedge reconstruction in AdS/CFT using the Petz recovery channel. In the case...
We propose a reconstruction of general bulk surfaces in any dimension in terms of the differential e...
We identify conditions for the entanglement entropy as a function of spatial region to be compatible...
We examine how to construct a spatial manifold and its geometry from the entanglement structure of a...
According to the AdS/CFT correspondence, the geometries of certain spacetimes are fully determined b...
The Ryu–Takayanagi and Hubeny–Rangamani–Takayanagi formulae suggest that bulk geometry emerges from ...
In the context of quantum theories of spacetime, one overarching question is how quantum information...
At the heart of recent progress in AdS/CFT is the question of subregion duality, or entanglement wed...
In this work, we show the robustness of uberholography and its associated quantum error correcting c...
We introduce a new algebraic framework for understanding nonperturbative gravitational aspects of bu...
We show that complementary state-specific reconstruction of logical (bulk) operators is equivalent t...
In the holographic correspondence, subregion duality posits that knowledge of the mixed state of a f...
We give a general construction of a setup that verifies bulk reconstruction, conservation of relativ...
The recent proposal of Almheiri et al.[http://arxiv.org/abs/1411.7041], together with the Ryu-Takaya...
Most of the literature in the bulk reconstruction program in holography focuses on recovering local ...
We revisit entanglement wedge reconstruction in AdS/CFT using the Petz recovery channel. In the case...
We propose a reconstruction of general bulk surfaces in any dimension in terms of the differential e...
We identify conditions for the entanglement entropy as a function of spatial region to be compatible...
We examine how to construct a spatial manifold and its geometry from the entanglement structure of a...
According to the AdS/CFT correspondence, the geometries of certain spacetimes are fully determined b...
The Ryu–Takayanagi and Hubeny–Rangamani–Takayanagi formulae suggest that bulk geometry emerges from ...