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Improved analytic solution of black hole superradiance

Shou-Shan Bao, Qi-Xuan Xu, Hong Zhang

2022Physical review. D/Physical review. D.26 citationsDOI

Abstract

The approximate solution of the Klein-Gordon equation for a real scalar field of mass $\ensuremath{\mu}$ in the geometry of a Kerr black hole obtained by Detweiler [Detweiler, Phys. Rev. D 22, 2323 (1980)] is widely used in the analysis of the stability of black holes as well as the search of axionlike particles. In this work, we confirm a a missing factor $1/2$ in this solution, which was first identified in [Pani et al., Phys. Rev. D 86, 104017 (2012)]. The corrected result has strange features that put questions on the power-counting strategy. We solve this problem by adding the next-to-leading order (NLO) contribution. Compared to the numerical results, the NLO solution reduces the percentage error of the LO solution by a factor of 2 for all important values of ${r}_{g}\ensuremath{\mu}$. Especially the percentage error is $\ensuremath{\lesssim}10%$ in the region of ${r}_{g}\ensuremath{\mu}\ensuremath{\lesssim}0.35$. The NLO solution also has a compact form and could be used straightforwardly.

Topics & Concepts

PhysicsSuperradianceScalar (mathematics)Scalar fieldBlack hole (networking)Order (exchange)Field (mathematics)Rotating black holeAxionMathematical physicsTheoretical physicsQuantum mechanicsParticle physicsGeometryPure mathematicsMathematicsAngular momentumRouting (electronic design automation)Link-state routing protocolFinanceEconomicsLaserDark matterComputer scienceComputer networkRouting protocolBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesPulsars and Gravitational Waves Research
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