Litcius/Paper detail

Second-order perturbations of Kerr black holes: Formalism and reconstruction of the first-order metric

Nicholas Loutrel, Justin L. Ripley, Elena Giorgi, Frans Pretorius

2021Physical review. D/Physical review. D.80 citationsDOIOpen Access PDF

Abstract

Motivated by gravitational wave observations of binary black hole mergers, we present a procedure to compute the leading-order nonlinear gravitational wave interactions around a Kerr black hole. We describe the formalism used to derive the equations for second-order perturbations. We develop a procedure that allows us to reconstruct the first-order metric perturbation solely from knowledge of the solution to the first-order Teukolsky equation, without the need of Hertz potentials. Finally, we illustrate this metric reconstruction procedure in the asymptotic limit for the first-order quasinormal modes of Kerr. In a companion paper [J. L. Ripley et al., Phys. Rev. D 103, 104018 (2021)] we present a numerical implementation of these ideas.

Topics & Concepts

PhysicsFormalism (music)Gravitational waveKerr metricBinary black holePerturbation (astronomy)Binary numberNonlinear systemGravitationMetric (unit)Classical mechanicsRotating black holeBlack hole (networking)General relativityNumerical relativityTheoretical physicsMathematical physicsLimit (mathematics)Mathematical analysisNumerical analysisLinearized gravityQuantum mechanicsPulsars and Gravitational Waves ResearchAstrophysical Phenomena and ObservationsRelativity and Gravitational Theory
Second-order perturbations of Kerr black holes: Formalism and reconstruction of the first-order metric | Litcius