A new derivation of singularity theorems with weakened energy hypotheses
Fewster, Chris, Kontou, Eleni
2020White Rose Research Online (University of Leeds, The University of Sheffield, University of York)23 citationsOpen Access PDF
Abstract
The original singularity theorems of Penrose and Hawking were proved for matter obeying the Null Energy Condition or Strong Energy Condition respectively. Various authors have proved versions of these results under weakened hypotheses, by considering the Riccati inequality obtained from Raychaudhuri's equation. Here, we give a different derivation that avoids the Raychaudhuri equation but instead makes use of index form methods. We show how our results improve over existing methods and how they can be applied to hypotheses inspired by Quantum Energy Inequalities. In this last case, we make quantitative estimates of the initial conditions required for our singularity theorems to apply.
Topics & Concepts
SingularityEnergy conditionPhysicsNull (SQL)HawkingEnergy (signal processing)Mathematical physicsRiccati equationApplied mathematicsTheoretical physicsPure mathematicsMathematicsMathematical analysisQuantum mechanicsComputer scienceGeneral relativityPartial differential equationDatabaseEntropy (arrow of time)Black Holes and Theoretical PhysicsCosmology and Gravitation TheoriesNoncommutative and Quantum Gravity Theories