The issue concerning semi-classical methods recently developed in deriving the conditions for Hawking radiation as tunneling, is revisited and applied also to rotating black hole solutions as well as to the extremal cases. It is noticed how the tunneling method fixes the temperature of extremal black hole to be zero, unlike the Euclidean regularity method that allows an arbitrary compactification period. A comparison with other approaches is presented. *
The Einstein's equations with a negative cosmological constant admit
solutions which are asymptotically anti-de Sitter space. Matter fields in
anti-de Sitter space can be in stable equilibrium even if the potential energy
is unbounded from below, violating the weak energy condition. Hence there is no
fundamental reason that black hole's horizons should have spherical topology.
In anti-de Sitter space the Einstein's equations admit black hole solutions
where the horizon can be a Riemann surface with genus $g$. The case $g=0$ is
the asymptotically anti-de Sitter black hole first studied by Hawking-Page,
which has spherical topology. The genus one black hole has a new free parameter
entering the metric, the conformal class to which the torus belongs. The genus
$g>1$ black hole has no other free parameters apart from the mass and the
charge. All such black holes exhibits a natural temperature which is identified
as the period of the Euclidean continuation and there is a mass formula
connecting the mass with the surface gravity and the horizon area of the black
hole. The Euclidean action and entropy are computed and used to argue that the
mass spectrum of states is positive definite.Comment: 14 pages, standard latex, enlarged version, major conceptual changes,
more detailed calculations, new references adde
The heat-kernel expansion and ζ-regularization techniques for quantum field theory and extended objects on curved space-times are reviewed. In particular, ultrastatic space-times with spatial section consisting in manifold with constant curvature are discussed in detail. Several mathematical results, relevant to physical applications are presented, including exact solutions of the heat-kernel equation, a simple exposition of hyperbolic geometry and an elementary derivation of the Selberg trace formula. With regards to the physical applications, the vacuum energy for scalar fields, the one-loop renormalization of a self-interacting scalar field theory on a hyperbolic space-time, with a discussion on the topological symmetry breaking, the finite temperature effects and the Bose-Einstein condensation, are considered. Some attempts to generalize the results to extended objects are also presented, including some remarks on path integral quantization, asymptotic properties of extended objects and a novel representation for the one-loop (super)string free energy.
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