Chaotic motion in the Johannsen-Psaltis spacetime

TL;DR

This paper investigates chaotic geodesic motion in the Johannsen-Psaltis spacetime, a Kerr deviation designed to avoid pathologies, by analyzing phase space and sensitivity to initial conditions.

Contribution

It demonstrates that geodesic motion in the Johannsen-Psaltis spacetime can be chaotic, using numerical methods like Poincaré sections and Lyapunov exponents.

Findings

Chaotic behavior observed in geodesic motion.

Phase space analysis confirms chaos.

Lyapunov exponents quantify sensitivity.

Abstract

The Johannsen-Psaltis spacetime is a perturbation of the Kerr spacetime designed to avoid pathologies like naked singularities and closed timelike curves. This spacetime depends not only on the mass and the spin of the compact object, but also on extra parameters, making the spacetime deviate from Kerr; in this work we consider only the lowest order physically meaningful extra parameter. We use numerical examples to show that geodesic motion in this spacetime can exhibit chaotic behavior. We study the corresponding phase space by using Poincar\'{e} sections and rotation numbers to show chaotic behavior, and we use Lyapunov exponents to directly estimate the sensitivity to initial conditions for chaotic orbits.