CFT sewing as the dual of AdS cut-and-paste

DOI10.1007/JHEP02(2020)152zbMATH Open1435.81187arXiv1909.09330OpenAlexW3007054772MaRDI QIDQ2188654

Author name not available (Why is that?)

Publication date: 11 June 2020

Published in: (Search for Journal in Brave)

Abstract: The CPT map allows two states of a quantum field theory to be sewn together over CPT-conjugate partial Cauchy surfaces

R_{1}, R_{2}

to make a state on a new spacetime. We study the holographic dual of this operation in the case where the original states are CPT-conjugate within

R_{1}, R_{2}

to leading order in the bulk Newton constant

G

, and where the bulk duals are dominated by classical bulk geometries

g_{1}, g_{2}

. For states of fixed area on the

R_{1}, R_{2}

HRT-surfaces, we argue that the bulk geometry

dual to the newly sewn state is given by deleting the entanglement wedges of

R_{1}, R_{2}

from

g_{1}, g_{2}

, gluing the remaining complementary entanglement wedges of

together across the HRT surface, and solving the equations of motion to the past and future. The argument uses the bulk path integral and assumes it to be dominated by a certain natural saddle. For states where the HRT area is not fixed, the same bulk cut-and-paste is dual to a modified sewing that produces a generalization of the canonical purification state

s q r t h o

discussed recently by Dutta and Faulkner. Either form of the construction can be used to build CFT states dual to bulk geometries associated with multipartite reflected entropy.

Full work available at URL: https://arxiv.org/abs/1909.09330

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