1+1+2 Electromagnetic perturbations on general LRS space-times: Regge-Wheeler and Bardeen-Press equations

TL;DR

This paper develops new gauge-invariant techniques to decouple electromagnetic perturbations on LRS space-times, deriving generalized Regge-Wheeler and Bardeen-Press equations that extend classical results to more general geometries.

Contribution

The authors introduce a novel complex 1+1+2 formalism and derive new decoupled equations for EM perturbations on LRS space-times, including generalized RW and BP equations.

Findings

Derived a generalized Regge-Wheeler equation for LRS space-times.

Formulated new Bardeen-Press type equations for electromagnetic perturbations.

Developed a complex 1+1+2 formalism facilitating decoupling of Maxwell equations.

Abstract

We use the, covariant and gauge-invariant, 1+1+2 formalism developed by Clarkson and Barrett, and develop new techniques, to decouple electromagnetic (EM) perturbations on arbitrary locally rotationally symmetric (LRS) space-times. Ultimately, we derive 3 decoupled complex equations governing 3 complex scalars. One of these is a new Regge-Wheeler (RW) equation generalized for LRS space-times, whereas the remaining two are new generalizations of the Bardeen-Press (BP) equations. This is achieved by first using linear algebra techniques to rewrite the first-order Maxwell equations in a new complex 1+1+2 form which is conducive to decoupling. This new complex system immediately yields the generalized RW equation, and furthermore, we also derive a decoupled equation governing a newly defined complex EM 2-vector. Subsequently, a further decomposition of the 1+1+2 formalism into a 1+1+1+1 formalism is developed, allowing us to decompose the complex EM 2-vector, and its governing equations, into spin-weighted scalars, giving rise to the generalized BP equations.