A New Look at the C0-formulation of the Strong Cosmic Censorship Conjecture

Abstract

We examine the C0-formulation of the strong cosmic censorship conjecture (SCC) from a quantum complexity-theoretic perspective and argue that for generic black hole parameters as initial conditions for the Einstein equations, corresponding to the expected geometry of a hyperbolic black hole, the metric is C0-extendable to a larger Lorentzian manifold across the Cauchy horizon. To demonstrate the pathologies associated with a hypothetical validity of the C0 SCC, we prove it violates the "complexity=volume" conjecture for a low-temperature hyperbolic AdSd+1 black hole dual to a CFT living on a (d-1)-dimensional hyperboloid Hd-1, where in order to preserve the gauge/gravity duality we impose a lower bound on the interior metric extendability of order the classical recurrence time.