Simulations of gravitational collapse in null coordinates IV: evolving through the event horizon, with an application to the spherical charged scalar field
Abstract
We consider line elements of the form -2G\,du\,(dx+B\,du) + R2(...), where (...) does not contain dx. Surfaces of constant u are then null surfaces, and their affinely parameterised generators have tangent vector G-1∂x. Considering u as the time coordinate, we can evolve either R or G, with the other one found by solving the Raychaudhuri equation along the null generators, or we can evolve both. This choice of formulation is independent from the remaining gauge choice x x'(u,x,...) in the line element above, which is fixed incrementally by the choice of B. For example, we can evolve G, in order to be able to evolve through an event horizon, and use B to adapt the coordinates to type-II critical collapse. As a demonstration of these ideas, we consider a charged scalar field in spherical symmetry. We consider two settings: a domain where the outgoing null cones emanate from a regular centre R=0, and a domain where they emanate from an ingoing-null boundary. In both settings, we demonstrate convergence with resolution, within each formulation and between the three formulations. As testbeds, we compute the critical exponents and periodic fine-structures of the black hole charge and mass scaling laws in a one-parameter family of charged regular initial data, and examples of perturbed extremal Reissner-Nordstr\"om solutions.
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