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Complete set of quasi-conserved quantities for spinning particles around Kerr

Geoffrey Compère, Adrien Druart

2022SciPost Physics27 citationsDOIOpen Access PDF

Abstract

We revisit the conserved quantities of the Mathisson-Papapetrou-Tulczyjew equations describing the motion of spinning particles on a fixed background. Assuming Ricci-flatness and the existence of a Killing-Yano tensor, we demonstrate that besides the two non-trivial quasi-conserved quantities, i.e. conserved at linear order in the spin, found by Rüdiger, non-trivial quasi-conserved quantities are in one-to-one correspondence with non-trivial mixed-symmetry Killing tensors. We prove that no such stationary and axisymmetric mixed-symmetry Killing tensor exists on the Kerr geometry. We discuss the implications for the motion of spinning particles on Kerr spacetime where the quasi-constants of motion are shown not to be in complete involution.

Topics & Concepts

Conserved quantitySpacetimePhysicsSpinningRotational symmetryClassical mechanicsSymmetry (geometry)Equations of motionMotion (physics)Mathematical physicsMathematicsQuantum mechanicsGeometryMechanicsChemistryPolymer chemistryPulsars and Gravitational Waves ResearchBlack Holes and Theoretical PhysicsAstrophysical Phenomena and Observations
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