More about Birkhoff's Invariant and Thorne's Hoop Conjecture for Horizons

Abstract

A recent precise formulation of the hoop conjecture in four spacetime dimensions is that the Birkhoff invariant β (the least maximal length of any sweepout or foliation by circles) of an apparent horizon of energy E and area A should satisfy β 4 π E. This conjecture together with the Cosmic Censorship or Isoperimetric inequality implies that the length of the shortest non-trivial closed geodesic satisfies 2 π A. We have tested these conjectures on the horizons of all four-charged rotating black hole solutions of ungauged supergravity theories and find that they always hold. They continue to hold in the the presence of a negative cosmological constant, and for multi-charged rotating solutions in gauged supergravity. Surprisingly, they also hold for the Ernst-Wild static black holes immersed in a magnetic field, which are asymptotic to the Melvin solution. In five spacetime dimensions we define β as the least maximal area of all sweepouts of the horizon by two-dimensional tori, and find in all cases examined that β(g) 16 π3 E, which we conjecture holds quiet generally for apparent horizons. In even spacetime dimensions D=2N+2, we find that for sweepouts by the product S1 × SD-4, β is bounded from above by a certain dimension-dependent multiple of the energy E. We also find that D-2 is bounded from above by a certain dimension-dependent multiple of the horizon area A. Finally, we show that D-3 is bounded from above by a certain dimension-dependent multiple of the energy, for all Kerr-AdS black holes.