Reparametrization modes, shadow operators, and quantum chaos in higher-dimensional CFTs
Reparametrization modes, shadow operators, and quantum chaos in higher-dimensional CFTs
We study two novel approaches to efficiently encoding universal constraints imposed by conformal symmetry, and describe applications to quantum chaos in higher dimensional CFTs. The first approach consists of a reformulation of the shadow operator formalism and kinematic space techniques. We observe that the shadow operator associated with the stress tensor (or other conserved currents) can be written as the descendant of a field ${\cal E}$ with negative dimension. Computations of stress tensor contributions to conformal blocks can be systematically organized in terms of the "soft mode" ${\cal E}$, turning them into a simple diagrammatic perturbation theory at large central charge. Our second (equivalent) approach concerns a theory of reparametrization modes, generalizing previous studies in the context of the Schwarzian theory and two-dimensional CFTs. Due to the conformal anomaly in even dimensions, gauge modes of the conformal group acquire an action and are shown to exhibit the same dynamics as the soft mode ${\cal E}$ that encodes the physics of the stress tensor shadow. We discuss the calculation of the conformal partial waves or the conformal blocks using our effective field theory. The separation of conformal blocks from shadow blocks is related to gauging of certain symmetries in our effective field theory of the soft mode. These connections explain and generalize various relations between conformal blocks, shadow operators, kinematic space, and reparametrization modes. As an application we study thermal physics in higher dimensions and argue that the theory of reparametrization modes captures the physics of quantum chaos in Rindler space. This is also supported by the observation of the pole skipping phenomenon in the conformal energy-energy two-point function on Rindler space.
hep-th, cond-mat.str-el, nlin.CD
Haehl, Felix M.
eb0d74fd-0d8b-4b1b-8686-79d43c2a3a5f
Reeves, Wyatt
fb1e71b1-2edc-434d-8062-189c8d5c4852
Rozali, Moshe
fc0eb0db-9735-41d1-b543-76f2be76d809
18 November 2019
Haehl, Felix M.
eb0d74fd-0d8b-4b1b-8686-79d43c2a3a5f
Reeves, Wyatt
fb1e71b1-2edc-434d-8062-189c8d5c4852
Rozali, Moshe
fc0eb0db-9735-41d1-b543-76f2be76d809
Haehl, Felix M., Reeves, Wyatt and Rozali, Moshe
(2019)
Reparametrization modes, shadow operators, and quantum chaos in higher-dimensional CFTs.
JHEP, 2019 (11), [102].
(doi:10.1007/JHEP11(2019)102).
Abstract
We study two novel approaches to efficiently encoding universal constraints imposed by conformal symmetry, and describe applications to quantum chaos in higher dimensional CFTs. The first approach consists of a reformulation of the shadow operator formalism and kinematic space techniques. We observe that the shadow operator associated with the stress tensor (or other conserved currents) can be written as the descendant of a field ${\cal E}$ with negative dimension. Computations of stress tensor contributions to conformal blocks can be systematically organized in terms of the "soft mode" ${\cal E}$, turning them into a simple diagrammatic perturbation theory at large central charge. Our second (equivalent) approach concerns a theory of reparametrization modes, generalizing previous studies in the context of the Schwarzian theory and two-dimensional CFTs. Due to the conformal anomaly in even dimensions, gauge modes of the conformal group acquire an action and are shown to exhibit the same dynamics as the soft mode ${\cal E}$ that encodes the physics of the stress tensor shadow. We discuss the calculation of the conformal partial waves or the conformal blocks using our effective field theory. The separation of conformal blocks from shadow blocks is related to gauging of certain symmetries in our effective field theory of the soft mode. These connections explain and generalize various relations between conformal blocks, shadow operators, kinematic space, and reparametrization modes. As an application we study thermal physics in higher dimensions and argue that the theory of reparametrization modes captures the physics of quantum chaos in Rindler space. This is also supported by the observation of the pole skipping phenomenon in the conformal energy-energy two-point function on Rindler space.
More information
Accepted/In Press date: 7 November 2019
Published date: 18 November 2019
Additional Information:
45 pages, 2 figures
Keywords:
hep-th, cond-mat.str-el, nlin.CD
Identifiers
Local EPrints ID: 471228
URI: http://eprints.soton.ac.uk/id/eprint/471228
ISSN: 1126-6708
PURE UUID: 96481cfc-f6a0-42ff-b05e-7b0ca011c1fe
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Date deposited: 01 Nov 2022 17:32
Last modified: 17 Mar 2024 04:14
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Contributors
Author:
Felix M. Haehl
Author:
Wyatt Reeves
Author:
Moshe Rozali
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