Spinning particle dynamics and the innermost stable circular orbit in covariant loop quantum gravity
Аннотация
Abstract In this paper, we investigate the motion of spinning particles in the background of covariant loop quantum gravity black holes, focusing on two distinct effective metric solutions. Both metrics incorporate a quantum parameter ζ , which quantifies the corrections from loop quantum gravity. When ζ approaches zero, the spacetime reduces to the classical Schwarzschild solution. Using the pole-dipole approximation, we derive the equations of motion for spinning particles, accounting for the spin-curvature coupling. Our analysis reveals significant deviations in the behavior of the Innermost Stable Circular Orbit (ISCO) due to quantum effects. In the first effective metric, as ζ increases, the ISCO's radial position shifts, and for sufficiently large values of ζ , the ISCO disappears, allowing particles to hover above the black hole. For non-spinning particles, the mass-to-energy conversion efficiency also decreases as ζ increases. In contrast, in the second metric, ISCOs persist even for large values of ζ , albeit with a more restrictive spin range. Moreover, only when the spin is nonzero do various ISCO parameters exhibit dependence on ζ . These findings highlight the impact of loop quantum gravity corrections on the dynamics of spinning particles.
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