Ideal hydrodynamics inside as well as outside non-rotating black hole: Hamiltonian description in the Painlev\'e-Gullstrand coordinates

Abstract

It is demonstrated that with using Painlev\'e-Gullstrand coordinates in their quasi-Cartesian variant, the Hamiltonian functional for relativistic perfect fluid hydrodynamics near a non-rotating black hole differs from the corresponding flat-spacetime Hamiltonian just by a simple term. Moreover, the internal region of the black hole is then described uniformly together with the external region, because in Painlev\'e-Gullstrand coordinates there is no singularity at the event horizon. An exact solution is presented which describes stationary accretion of an ultra-hard matter ( n2) onto a moving black hole until reaching the central singularity. Equation of motion for a thin vortex filament on such accretion background is derived in the local induction approximation. The Hamiltonian for a fluid having ultra-relativistic equation of state n4/3 is calculated in explicit form, and the problem of centrally-symmetric stationary flow of such matter is solved analytically.