Event Horizon of the Monopole-Quadrupole solution: geometric and thermodynamic properties

Abstract

We investigate the general geometric properties of the surface of infinite red-shift corresponding to the event horizon of the static and axisymmetric solution of the Einstein vacuum equations that only possesses mass M and quadrupole moment Q. The deformation of the Schwarzschild surface r=2M produced by the quadrupole moment is shown, and the range of values of this multipole moment is specified, which preserves a regular, closed, continuous and differentiable surface. Some thermodynamic consequences and speculations ensuing from our results are discussed.