Critical collapse of an axisymmetric ultrarelativistic fluid in 2+1 dimensions

Abstract

We carry out numerical simulations of the gravitational collapse of a rotating perfect fluid with the ultrarelativistic equation of state P=, in axisymmetry in 2+1 spacetime dimensions with <0. We show that for 0.42, the critical phenomena are type I and the critical solution is stationary. The picture for 0.43 is more delicate: for small angular momenta, we find type II phenomena and the critical solution is quasistationary, contracting adiabatically. The spin-to-mass ratio of the critical solution increases as it contracts, and hence so does that of the black hole created at the end as we fine-tune to the black-hole threshold. Forming extremal black holes is avoided because the contraction of the critical solution smoothly ends as extremality is approached.