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Main Authors: Ishigaki, Shuta, Nakamura, Shin, Takasan, Kazuaki
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2303.02633
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author Ishigaki, Shuta
Nakamura, Shin
Takasan, Kazuaki
author_facet Ishigaki, Shuta
Nakamura, Shin
Takasan, Kazuaki
contents We propose a new method to compute nonlinear transport coefficients in holography, such as nonlinear DC conductivity and nonlinear friction coefficient. The conventional method can be applied only to the models whose action in the gravity dual has the ``square-root structure,'' i.e., the Dirac-Born-Infeld action of the probe D-branes or the Nambu-Goto action of the probe strings. Our method is applicable to a wider range of holographic models whose action does not have such a square-root structure. We propose a condition to obtain regular physical configurations in the gravity dual in the form of two simultaneous equations, which we call the patchwork condition. Our method also enables us to estimate the effective temperature of the nonequilibrium steady states in a wider range of holographic models. We show that a general model exhibits different effective temperatures for different fluctuation modes.
format Preprint
id arxiv_https___arxiv_org_abs_2303_02633
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Patchwork Conditions for Holographic Nonlinear Responses: A Computational Method for Electric Conductivity and Friction Coefficient
Ishigaki, Shuta
Nakamura, Shin
Takasan, Kazuaki
High Energy Physics - Theory
We propose a new method to compute nonlinear transport coefficients in holography, such as nonlinear DC conductivity and nonlinear friction coefficient. The conventional method can be applied only to the models whose action in the gravity dual has the ``square-root structure,'' i.e., the Dirac-Born-Infeld action of the probe D-branes or the Nambu-Goto action of the probe strings. Our method is applicable to a wider range of holographic models whose action does not have such a square-root structure. We propose a condition to obtain regular physical configurations in the gravity dual in the form of two simultaneous equations, which we call the patchwork condition. Our method also enables us to estimate the effective temperature of the nonequilibrium steady states in a wider range of holographic models. We show that a general model exhibits different effective temperatures for different fluctuation modes.
title Patchwork Conditions for Holographic Nonlinear Responses: A Computational Method for Electric Conductivity and Friction Coefficient
topic High Energy Physics - Theory
url https://arxiv.org/abs/2303.02633