More on the SW-QNM correspondence

@article{Bianchi2022MoreOT,
title={More on the SW-QNM correspondence},
author={Massimo Bianchi and Dario Consoli and Alfredo Grillo and Jos{\e} Francisco Morales},
journal={Journal of High Energy Physics},
year={2022},
volume={2022},
pages={1-45}
}`
We exploit the recently proposed correspondence between gravitational perturbations and quantum Seiberg-Witten curves to compute the spectrum of quasi-normal modes of asymptotically flat Kerr Newman black holes and establish detailed gauge/gravity dictionaries for a large class of black holes, D-branes and fuzzballs in diverse dimensions. QNM frequencies obtained from the quantum periods of SU(2) N $$\mathcal{N}$$ = 2 SYM with N f = 3 flavours are compared against numerical results, WKB…
2 Citations

Figures from this paper

Irregular Liouville correlators and connection formulae for Heun functions
• Physics, Mathematics
• 2022
We perform a detailed study of a class of irregular correlators in Liouville Conformal Field Theory, of the related Virasoro conformal blocks with irregular singularities and of their connection
Exact WKB and the quantum Seiberg-Witten curve for 4d $N=2$ pure $SU(3)$ Yang-Mills, Part I: Abelianization
We investigate the exact WKB method for the quantum Seiberg-Witten curve of 4d N = 2 pure SU(3) Yang-Mills, in the language of abelianization. The relevant differential equation is a third-order

References

SHOWING 1-10 OF 93 REFERENCES
The Kerr/CFT Correspondence and its Extensions
• G. Compère
• Physics, Medicine
Living reviews in relativity
• 2012
We present a first-principles derivation of the main results of the Kerr/CFT correspondence and its extensions using only tools from gravity and quantum field theory, filling a few gaps in the
Non-perturbative approaches to the quantum Seiberg-Witten curve
• Physics, Mathematics
• 2019
We study various non-perturbative approaches to the quantization of the Seiberg-Witten curve of ${\cal N}=2$, $SU(2)$ super Yang-Mills theory, which is closely related to the modified Mathieu
Remarks on holographic models of the Kerr-AdS5 geometry
• Physics
• 2021
We study the low-temperature limit of scalar perturbations of the Kerr-AdS5 black-hole for generic rotational parameters. We motivate the study by considering real-time holography of small black hole
Black-hole microstate spectroscopy: Ringdown, quasinormal modes, and echoes
Deep conceptual problems associated with classical black holes can be addressed in string theory by the “fuzzball” paradigm, which provides a microscopic description of a black hole in terms of a
Integrability and cycles of deformed N=2 gauge theory
• Physics, Mathematics
• 2020
Abstract To analyse pure N = 2 S U ( 2 ) gauge theory in the Nekrasov-Shatashvili (NS) limit (or deformed Seiberg-Witten (SW)), we use the Ordinary Differential Equation/Integrable Model (ODE/IM)
Kerr/CFT Correspondence
• Physics, Mathematics
• 2009
Quantum gravity in the region very near the horizon of an extreme Kerr black hole (whose angular momentum and mass are related by J=GM{sup 2}) is considered. It is shown that consistent boundary
Quantum integrability of N = 2 4d gauge theories
We provide a description of the quantum integrable structure behind the Thermodynamic Bethe Ansatz (TBA)like equation derived by Nekrasov and Shatashvili (NS) for N = 2 4d Super Yang-Mills (SYM)
Holographic description of non-supersymmetric orbifolded D1-D5-P solutions
• Physics
• 2015
A bstractNon-supersymmetric black hole microstates are of great interest in the context of the black hole information paradox. We identify the holographic description of the general class of
Quasinormal-mode spectrum of Kerr black holes and its geometric interpretation
• Physics
• 2012
There is a well-known, intuitive geometric correspondence between high-frequency quasinormal modes of Schwarzschild black holes and null geodesics that reside on the light ring (often called
A Solvable Deformation of Quantum Mechanics
• Physics, Mathematics
Symmetry, Integrability and Geometry: Methods and Applications
• 2019
The conventional Hamiltonian $H= p^2+ V_N(x)$, where the potential $V_N(x)$ is a polynomial of degree $N$, has been studied intensively since the birth of quantum mechanics. In some cases, its