Litcius/Paper detail

Naked Singularities in the Einstein-Euler System

Yan Guo, Mahir Hadžić, Juhi Jang

2023Annals of PDE12 citationsDOIOpen Access PDF

Abstract

In 1990, based on numerical and formal asymptotic analysis, Ori and Piran predicted the existence of selfsimilar spacetimes, called relativistic Larson-Penston solutions, that can be suitably flattened to obtain examples of spacetimes that dynamically form naked singularities from smooth initial data, and solve the radially symmetric Einstein-Euler system. Despite its importance, a rigorous proof of the existence of such spacetimes has remained elusive, in part due to the complications associated with the analysis across the so-called sonic hypersurface. We provide a rigorous mathematical proof. Our strategy is based on a delicate study of nonlinear invariances associated with the underlying non-autonomous dynamical system to which the problem reduces after a selfsimilar reduction. Key technical ingredients are a monotonicity lemma tailored to the problem, an ad hoc shooting method developed to construct a solution connecting the sonic hypersurface to the so-called Friedmann solution, and a nonlinear argument to construct the maximal analytic extension of the solution. Finally, we reformulate the problem in double-null gauge to flatten the selfsimilar profile and thus obtain an asymptotically flat spacetime with an isolated naked singularity.

Topics & Concepts

EinsteinNaked singularityEuler's formulaGravitational singularityPhysicsClassical mechanicsMathematicsMathematical analysisQuantum mechanicsCosmology and Gravitation TheoriesBlack Holes and Theoretical PhysicsAdvanced Differential Equations and Dynamical Systems