Anisotropic N = 4 Super-Yang-Mills Plasma and Its Instabilities

103

We construct anisotropic black brane solutions and analyse the behaviour of some of their metric perturbations. These solutions correspond to field theory duals in which rotational symmetry is broken due an externally applied, spatially constant, force. We find, in several examples, that when the anisotropy is sufficiently big compared to the temperature, some components of the viscosity tensor can become very small in units of the entropy density, parametrically violating the KSS bound. We obtain an expression relating these components of the viscosity, in units of the entropy density, to a ratio of metric components at the horizon of the black brane. This relation is generally valid, as long as the forcing function is translationally invariant, and it directly connects the parametric violation of the bound to the anisotropy in the metric at the horizon. Our results suggest the possibility that such small components of the viscosity tensor might also arise in anisotropic strongly coupled fluids found in nature.

Section: Jhep10(2015)028mentioning

confidence: 99%

The shear viscosity in anisotropic phases

Jain

Samanta

Trivedi

2015

103

“…The existence of solutions which interpolate between the anisotropic solutions in the IR and the AdS 5 × X 5 solutions in the UV was shown in [34,36]. These interpolating solutions can be considered as the dual of the RG flow between the two systems [35,36].…”

Section: Jhep04(2015)011mentioning

confidence: 99%

“…In this paper, we consider Lifshitz-like backgrounds in the context of their applications to the anisotropic quark-gluon plasma created in heavy-ion collisions [35]- [46]. A holographic model with a Lifshitz-like spacetime in the IR and AdS boundary conditions is supposed to be related with an anisotropic SYM quark-gluon plasma [36].…”

Section: Jhep04(2015)011mentioning

confidence: 99%

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Shock waves in Lifshitz-like spacetimes

Aref’eva

Golubtsova²

2015

We construct shock waves for Lifshitz-like geometries in four-and fivedimensional effective theories as well as in D3-D7 and D4-D6 brane systems. The solutions to the domain wall profile equations are found. Further, the study makes a connection with the implications for the quark-gluon plasma formation in heavy-ion collisions. According to the holographic approach, the multiplicity of particles produced in heavy-ion collisions can be estimated by the area of the trapped surface formed in shock wave collisions. We calculate the areas of trapped surfaces in the geometry of two colliding Lifshitz domain walls. Our estimates show that for five-dimensional cases with certain values of the critical exponent the dependence of multiplicity on the energy of colliding ions is rather close to the experimental data M ∼ s 0.15 observed at RHIC and LHC.

“…In particular, as we will see, the T 2 essentially just comes along for the ride. Now we consider the gauge for the two-form B given in the N N patch by 33) which is clearly well defined in U N N . We see that it is also well defined in U SN , after using (2.32).…”

Section: Jhep08(2014)006mentioning

confidence: 99%

Flowing from AdS5 to AdS3 with T 1,1

Donos

Gauntlett

2014

We construct supersymmetric domain wall solutions of type IIB supergravity that interpolate between AdS 5 × T 1,1 in the UV and AdS 3 × R 2 × S 2 × S 3 solutions in the IR. The R 2 factor can be replaced with a two-torus and then the solution describes a supersymmetric flow across dimensions, similar to wrapped brane solutions. While the domain wall solutions preserve (0, 2) supersymmetry, the AdS 3 solutions in the IR have an enhanced (4, 2) superconformal supersymmetry and are related by two T-dualities to the AdS 3 × S 3 × S 3 × S 1 type IIB solutions which preserve a large (4, 4) superconformal supersymmetry. The domain wall solutions exist within the N = 4 D = 5 gauged supergravity theory that is obtained from a consistent Kaluza-Klein truncation of type IIB supergravity on T 1,1 ; a feature driving the flows is that two D = 5 axion like fields, residing in the N = 4 Betti multiplet, depend linearly on the two legs of the R 2 factor.