Litcius/Paper detail

Killing Tensor and Carter Constant for Painlevé–Gullstrand Form of Lense–Thirring Spacetime

Joshua Baines, Thomas Berry, Alex Simpson, Matt Visser

2021Universe27 citationsDOIOpen Access PDF

Abstract

Recently, the authors have formulated and explored a novel Painlevé–Gullstrand variant of the Lense–Thirring spacetime, which has some particularly elegant features, including unit-lapse, intrinsically flat spatial 3-slices, and some particularly simple geodesics—the “rain” geodesics. At the linear level in the rotation parameter, this spacetime is indistinguishable from the usual slow-rotation expansion of Kerr. Herein, we shall show that this spacetime possesses a nontrivial Killing tensor, implying separability of the Hamilton–Jacobi equation. Furthermore, we shall show that the Klein–Gordon equation is also separable on this spacetime. However, while the Killing tensor has a 2-form square root, we shall see that this 2-form square root of the Killing tensor is not a Killing–Yano tensor. Finally, the Killing-tensor-induced Carter constant is easily extracted, and now, with a fourth constant of motion, the geodesics become (in principle) explicitly integrable.

Topics & Concepts

PhysicsSpacetimeGeodesicMathematical physicsTensor (intrinsic definition)Tensor densityWeyl tensorExact solutions in general relativityClassical mechanicsMetric tensorStationary spacetimeSolving the geodesic equationsTensor fieldQuantum field theory in curved spacetimeQuantum mechanicsRiemann curvature tensorMathematical analysisGeometryMathematicsQuantum gravityQuantumCurvatureBlack Holes and Theoretical PhysicsPulsars and Gravitational Waves ResearchNoncommutative and Quantum Gravity Theories