Shear sum rule in higher derivative gravity theories

Chowdhury, Subham Dutta

doi:10.1007/jhep12(2017)156

Cited by 4 publications

(3 citation statements)

References 30 publications

(88 reference statements)

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“…Other generalizations of these bounds have been explored in Li et al (2016a), Komargodski et al (2017a), Chowdhury et al (2017a), Cordova et al (2017b), Meltzer and Perlmutter (2017), and Cordova and Diab (2018). Sum rules involving the same coefficients were also recently presented in Witczak-Krempa (2015), Chowdhury et al (2017b), Chowdhury (2017), and Gillioz et al (2017Gillioz et al ( , 2018.…”

Section: Ope Coefficientsmentioning

confidence: 99%

The Conformal Bootstrap: Theory, Numerical Techniques, and Applications

Poland,

Rychkov,

Vichi

2018

Preprint

192

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Conformal field theories have been long known to describe the fascinating universal physics of scale invariant critical points. They describe continuous phase transitions in fluids, magnets, and numerous other materials, while at the same time sit at the heart of our modern understanding of quantum field theory. For decades it has been a dream to study these intricate strongly coupled theories nonperturbatively using symmetries and other consistency conditions. This idea, called the conformal bootstrap, saw some successes in two dimensions but it is only in the last ten years that it has been fully realized in three, four, and other dimensions of interest. This renaissance has been possible both due to significant analytical progress in understanding how to set up the bootstrap equations and the development of numerical techniques for finding or constraining their solutions. These developments have led to a number of groundbreaking results, including world record determinations of critical exponents and correlation function coefficients in the Ising and O(N ) models in three dimensions. This article will review these exciting developments for newcomers to the bootstrap, giving an introduction to conformal field theories and the theory of conformal blocks, describing numerical techniques for the bootstrap based on convex optimization, and summarizing in detail their applications to fixed points in three and four dimensions with no or minimal supersymmetry.

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Section: Ope Coefficientsmentioning

confidence: 99%

The Conformal Bootstrap: Theory, Numerical Techniques, and Applications

Poland,

Rychkov,

Vichi

2018

Preprint

192

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“…Above metric was first derived in [38]. It had been used by [38,39] to show the viscosity bound violation and shear sum rule in higher derivative gravity theories [46]. We will use this metric to study the effect of quadratic gravity on the butterfly velocity.…”

Section: Formulamentioning

confidence: 99%

“…Holographic superconductors with higher curvature corrections had been extensively studied [43][44][45]. Holographic shear sum rule in Einstein gravity corrected by squared curvature was studied in [46]. The higher derivative terms are shown to have a strong impact on the bound on charge diffusion [47,48].…”

Section: Introductionmentioning

confidence: 99%

Butterfly velocity in quadratic gravity

Huang

2018

Class. Quantum Grav.

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We present a systematic procedure of finding the shock wave equation in anisotropic spacetime of quadratic gravity with Lagrangian L = R +Λ+αR µνσρ R µνσρ +βR µν R µν +γR 2 +L matter . The general formula of the butterfly velocity is derived. We show that the shock wave equation in the planar, spherical or hyperbolic black hole spacetime of Einstein-Gauss-Bonnet gravity is the same as that in Einstein gravity if space is isotropic. We consider the modified AdS spacetime deformed by the leading correction of the quadratic curvatures and find that the fourth order derivative shock wave equation leads to two butterfly velocities if 4α + β < 0. We also show that the butterfly velocity in the D=4 planar black hole is not corrected by the quadratic gravity if 4α + β = 0, which includes the R 2 gravity. In general, the correction of butterfly velocity by the quadratic gravity may be positive or negative, depends on the values of α, β, γ and temperature. We also investigate the butterfly velocity in the Gauss-Bonnet massive gravity.

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Thermal CFTs in momentum space

Manenti

2020

J. High Energ. Phys.

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We study some aspects of conformal field theories at finite temperature in momentum space. We provide a formula for the Fourier transform of a thermal conformal block and study its analytic properties. In particular we show that the Fourier transform vanishes when the conformal dimension and spin are those of a "double twist" operator ∆ = 2∆ φ + ℓ + 2n. By analytically continuing to Lorentzian signature we show that the spectral density at high spatial momenta has support on the spectrum condition |ω| > |k|. This leads to a series of sum rules. Finally, we explicitly match the thermal block expansion with the momentum space Green's function at finite temperature in several examples. 14 6.

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Shear sum rule in higher derivative gravity theories

Cited by 4 publications

References 30 publications

The Conformal Bootstrap: Theory, Numerical Techniques, and Applications

The Conformal Bootstrap: Theory, Numerical Techniques, and Applications

Butterfly velocity in quadratic gravity

Thermal CFTs in momentum space

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