Kerr Perihelion Precession via the Laplace-Runge-Lenz Vector Method

Abstract

We calculate, up to the first-order in the black hole spin, the perihelion precession of a test particle in the equatorial plane of a Kerr black hole using the perturbative Laplace-Runge-Lenz (LRL) vector method. To account for the dragging of inertial frames, we modify the LRL vector by incorporating a counteracting term in the angular momentum, which preserves the Keplerian orbit form to first order. We derive the standard Lense-Thirring precession result, leading to a transparent reinterpretation of known results, clarifying the role of frame dragging in LRL-based perturbation methods.

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