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Einstein-scalar–Gauss-Bonnet black holes: Analytical approximation for the metric and applications to calculations of shadows

R. A. Konoplya, Thomas D. Pappas, A. Zhidenko

2020Physical review. D/Physical review. D.94 citationsDOIOpen Access PDF

Abstract

Recently, numerical solutions to the field equations of Einstein-scalar--Gauss-Bonnet (EsGB) gravity that correspond to black holes with nontrivial scalar hair have been reported. Here, we employ the method of the continued-faction expansion in terms of a compact coordinate in order to obtain an analytical approximation for the aforementioned solutions. For a wide variety of coupling functionals to the Gauss-Bonnet term we were able to obtain analytical expressions for the metric functions and the scalar field. In addition we estimated the accuracy of these approximations by calculating the black-hole shadows for such black holes. Excellent agreement between the numerical solutions and analytical approximations has been found.

Topics & Concepts

EinsteinScalar (mathematics)Gauss–Bonnet theoremGaussPhysicsMetric (unit)Mathematical physicsTheoretical physicsClassical mechanicsMathematicsGeometryQuantum mechanicsEngineeringOperations managementPulsars and Gravitational Waves ResearchAstrophysical Phenomena and ObservationsBlack Holes and Theoretical Physics
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