Dissipative hydrodynamics with higher-form symmetry

Armas, Jay; Gath, Jakob; Jain, Akash; Pedersen, Andreas Vigand

doi:10.1007/jhep05(2018)192

Cited by 31 publications

(64 citation statements)

References 47 publications

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“…The case of d = 2 involving two one-form symmetries was considered in [22], albeit in a very restrictive case and ignoring the issues that require partial symmetry breaking. The understanding of partial symmetry breaking is essential for consistency of higher-form hydrodynamics with thermal equilibrium partition functions, as has been previously observed in [25,26].…”

Section: Viscoelastic Fluids As Higher-form Superfluidsmentioning

confidence: 91%

“…In app. C.3 we provide the comparison between the ideal order higher-form hydrodynamics of this section with that of [25].…”

Section: Revisiting Ideal Viscoelastic Fluidsmentioning

confidence: 99%

“…We can also define a projector This can be compared directly to section 2 of [25] with Q = q 11 √ γ 11 and µ = √ γ 11 . In principle, we can extend this comparison to include one-derivative corrections as well.…”

Section: C1 Comparison With Fukuma-sakatani Formulationmentioning

confidence: 99%

“…In this section, we compare our construction of viscoelastic fluids in terms of higher-form symmetries given in section 4 to the higher-form hydrodynamics formulated in [25]. The work of [25] only involves a single higher-form symmetry as opposed to the multiple copies generically required in viscoelastic hydrodynamics. Therefore, a precise comparison is only possible for k = 1.…”

Section: Modesmentioning

confidence: 99%

“…Recently, it has been argued that viscoelastic hydrodynamics can be recast as a theory of higherform hydrodynamics making its global symmetries manifest and avoiding the need to introduce microscopic dynamical fields [22]. This follows the recent line of research where hydrodynamic systems with dynamical fields, such as magnetohydrodynamics with dynamical gauge fields, are recast in terms of dual hydrodynamic systems with higher-form symmetries [23][24][25][26][27][28]. Building up on this idea, here we provide a completely equivalent description of viscoelastic hydrodynamics of anisotropic (liquid) crystals in arbitrary spacetime dimensions by identifying the correct degrees of freedom of higher-form hydrodynamics.…”

Section: Introductionmentioning

confidence: 99%

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Viscoelastic hydrodynamics and holography

Armas

Jain

2020

J. High Energ. Phys.

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122

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We formulate the theory of nonlinear viscoelastic hydrodynamics of anisotropic crystals in terms of dynamical Goldstone scalars of spontaneously broken translational symmetries, under the assumption of homogeneous lattices and absence of plastic deformations. We reformulate classical elasticity effective field theory using surface calculus in which the Goldstone scalars naturally define the position of higher-dimensional crystal cores, covering both elastic and smectic crystal phases. We systematically incorporate all dissipative effects in viscoelastic hydrodynamics at first order in a long-wavelength expansion and study the resulting rheology equations. In the process, we find the necessary conditions for equilibrium states of viscoelastic materials. In the linear regime and for isotropic crystals, the theory includes the description of Kelvin-Voigt materials. Furthermore, we provide an entirely equivalent description of viscoelastic hydrodynamics as a novel theory of higher-form superfluids in arbitrary dimensions where the Goldstone scalars of partially broken generalised global symmetries play an essential role. An exact map between the two formulations of viscoelastic hydrodynamics is given. Finally, we study holographic models dual to both these formulations and map them one-to-one via a careful analysis of boundary conditions. We propose a new simple holographic model of viscoelastic hydrodynamics by adopting an alternative quantisation for the scalar fields.

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Section: Viscoelastic Fluids As Higher-form Superfluidsmentioning

confidence: 91%

“…In app. C.3 we provide the comparison between the ideal order higher-form hydrodynamics of this section with that of [25].…”

Section: Revisiting Ideal Viscoelastic Fluidsmentioning

confidence: 99%

Section: C1 Comparison With Fukuma-sakatani Formulationmentioning

confidence: 99%

Section: Modesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Viscoelastic hydrodynamics and holography

Armas

Jain

2020

J. High Energ. Phys.

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122

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One-form superfluids & magnetohydrodynamics

2020

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We use the framework of generalised global symmetries to study various hydrodynamic regimes of hot electromagnetism. We formulate the hydrodynamic theories with an unbroken or a spontaneously broken U(1) one-form symmetry. The latter of these describes a one-form superfluid, which is characterised by a vector Goldstone mode and a two-form superfluid velocity. Two special limits of this theory have been studied in detail: the string fluid limit where the U(1) one-form symmetry is partly restored, and the electric limit in which the symmetry is completely broken. The transport properties of these theories are investigated in depth by studying the constraints arising from the second law of thermodynamics and Onsager's relations at first order in derivatives. We also construct a hydrostatic effective action for the Goldstone modes in these theories and use it to characterise the space of all equilibrium configurations. To make explicit contact with hot electromagnetism, the traditional treatment of magnetohydrodynamics, where the electromagnetic photon is incorporated as dynamical degrees of freedom, is extended to include parity-violating contributions. We argue that the chemical potential and electric fields are not independently dynamical in magnetohydrodynamics, and illustrate how to eliminate these within the hydrodynamic derivative expansion using Maxwell's equations. Additionally, a new hydrodynamic theory of non-conducting, but polarised, plasmas is formulated, focusing primarily on the magnetically dominated sector. Finally, it is shown that the different limits of one-form superfluids formulated in terms of generalised global symmetries are exactly equivalent to magnetohydrodynamics and the hydrodynamics of non-conducting plasmas at the non-linear level.1 Throughout this work, we often refer to to this formulation as the string fluid formulation of MHD. 2 This process of dualisation is commonly applied in the context of numerical studies of MHD [27]. The conservation of the two-form current splits into what is usually denoted as the induction equation and the no-monopole constraint. However, no formal study of the hydrodynamic properties and expansion in this context had been performed. This is one of the goals of this paper.3 It may be possible to relax the assumptions of the string fluid formulation in order to be able to describe plasmas that are not electrically neutral. Further comments on this point are left to a more speculative discussion in sec. 8. 1. Introduction | 6 2. The setup of one-form hydrodynamics | 7 Comments on related workDuring the completion of this work, we became aware of an upcoming related work that investigates different aspects of magnetohydrodynamics [30], and which has considerable overlap with [24]. We have provided a comparison between our work and that of [30] in app. B. We also generalised parts of [30] as to construct an ideal order effective Lagrangian for the hydrodynamic theories of sec. 3 and 4. Additionally, we have also formulated an order parameter that describes t...

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Holography and magnetohydrodynamics with dynamical gauge fields

Ahn

Baggioli

Huh

et al. 2023

J. High Energ. Phys.

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Within the framework of holography, the Einstein-Maxwell action with Dirichlet boundary conditions corresponds to a dual conformal field theory in presence of an external gauge field. Nevertheless, in many real-world applications, e.g., magnetohydrodynamics, plasma physics, superconductors, etc. dynamical gauge fields and Coulomb interactions are fundamental. In this work, we consider bottom-up holographic models at finite magnetic field and (free) charge density in presence of dynamical boundary gauge fields which are introduced using mixed boundary conditions. We numerically study the spectrum of the lowest quasi-normal modes and successfully compare the obtained results to magnetohydrodynamics theory in 2 + 1 dimensions. Surprisingly, as far as the electromagnetic coupling is small enough, we find perfect agreement even in the large magnetic field limit. Our results prove that a holographic description of magnetohydrodynamics does not necessarily need higher-form bulk fields but can be consistently derived using mixed boundary conditions for standard gauge fields.

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Dissipative hydrodynamics with higher-form symmetry

Cited by 31 publications

References 47 publications

Viscoelastic hydrodynamics and holography

Viscoelastic hydrodynamics and holography

One-form superfluids & magnetohydrodynamics

Holography and magnetohydrodynamics with dynamical gauge fields

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