2019
DOI: 10.1103/physrevd.99.086012
|View full text |Cite
|
Sign up to set email alerts
|

Holography and hydrodynamics with weakly broken symmetries

Abstract: Hydrodynamics is a theory of long-range excitations controlled by equations of motion that encode the conservation of a set of currents (energy, momentum, charge, etc.) associated with explicitly realized global symmetries. If a system possesses additional weakly broken symmetries, the low-energy hydrodynamic degrees of freedom also couple to a few other "approximately conserved" quantities with parametrically long relaxation times. It is often useful to consider such approximately conserved operators and corr… Show more

Help me understand this report
View preprint versions

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1

Citation Types

12
158
3

Year Published

2019
2019
2021
2021

Publication Types

Select...
7
1

Relationship

1
7

Authors

Journals

citations
Cited by 120 publications
(182 citation statements)
references
References 118 publications
(277 reference statements)
12
158
3
Order By: Relevance
“…We find this observation very interesting and similar to what discussed in [49][50][51]69]. It would be valuable, to show with field theory methods that diffusive Goldstone bosons, like in [53], acquire a small propagating speed (together with a mass and a damping), when EXB is introduced.…”
Section: The Transverse Sectorsupporting
confidence: 78%
“…We find this observation very interesting and similar to what discussed in [49][50][51]69]. It would be valuable, to show with field theory methods that diffusive Goldstone bosons, like in [53], acquire a small propagating speed (together with a mass and a damping), when EXB is introduced.…”
Section: The Transverse Sectorsupporting
confidence: 78%
“…Then, we analyze carefully the dispersion relation of the quantum critical plasmons and in particular their possible overdamped nature. We will discover a peculiar transition between a standard plasmon dispersion relation ω 2 = ω 2 p + c 2 k 2 and a propagating sound wave ω = ck which in the intermediate regime displays a k-gap dispersion relation [6,21] 3 . The k-gap simply refers to a dispersion relation of the type:…”
Section: Figurementioning
confidence: 92%
“…At this point, we are not aware of a physical hydrodynamic system with unbroken generalised global symmetries at the boundary as described in [27]. This fact has repercussions to several other constructions studied in [70], where the Goldstone modes of spontaneous broken global symmetries have not been taken into account. We wish to study these constructions more carefully in the near future.…”
Section: Finite Relaxation Timementioning
confidence: 97%
“…It would be interesting to consider the case of arbitrary finite relaxation times as in [7] in such a way that deviations away from the hydrodynamic regime are under control. In these situations, the framework of quasi-hydrodynamics will most likely be useful, as in [70].…”
Section: Finite Relaxation Timementioning
confidence: 99%