Segmented strings and holography
- URL: http://arxiv.org/abs/2304.10389v2
- Date: Thu, 23 Nov 2023 11:40:39 GMT
- Title: Segmented strings and holography
- Authors: Bercel Boldis, P\'eter L\'evay
- Abstract summary: We show that the area of the world sheet of a string segment on the AdS side can be connected to fidelity susceptibility on the CFT side.
This quantity has another interpretation as the computational complexity for infinitesimally separated states corresponding to causal diamonds.
- Score: 0.0
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: In this paper we establish a connection between segmented strings propagating
in $AdS_{d+1}$ and $CFT_d$ subsystems in Minkowski spacetime characterized by
quantum information theoretic quantities calculated for the vacuum state. We
show that the area of the world sheet of a string segment on the AdS side can
be connected to fidelity susceptibility (the real part of the quantum geometric
tensor) on the CFT side. This quantity has another interpretation as the
computational complexity for infinitesimally separated states corresponding to
causal diamonds that are displaced in a spacelike manner according to the
metric of kinematic space. These displaced causal diamonds encode information
for a unique reconstruction of the string world sheet segments in a holographic
manner. Dually the bulk segments are representing causally ordered sets of
consecutive boundary events in boosted inertial frames or in noninertial ones
proceeding with constant acceleration. For the special case of $AdS_3$ one can
also see the segmented stringy area in units of $4GL$ ($G$ is Newton's constant
and $L$ is the AdS length) as the conditional mutual information $I(A,C\vert
B)$ calculated for a trapezoid configuration arising from boosted spacelike
intervals $A$,$B$ and $C$. In this special case the variation of the
discretized Nambu-Goto action leads to an equation for entanglement entropies
in the boundary theory of the form of a Toda equation. For arbitrary $d$ the
string world sheet patches are living in the modular slices of the entanglement
wedge. They seem to provide some sort of tomography of the entanglement wedge
where the patches are linked together by the interpolation ansatz, i.e. the
discretized version of the equations of motion for the Nambu-Goto action.
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