A partition function for Schwarzschild-AdS and Kerr-AdS black holes and for quantized globally hyperbolic spacetimes with a negative cosmological constant

Abstract

We apply quantum statistics to our quantized versions of Schwarzschild-AdS and Kerr-AdS black holes and also to the quantized globally hyperbolic spacetimes having an asymptotically Euclidean Cauchy hypersurface by first proving, for the temporal Hamiltonian H0, that e-β H0, β>0, is of trace class and then, that this result is also valid for the spatial Hamiltonian H1, which has the same eigenvalues but with larger multiplicities. Since the lowest eigenvalue is strictly positive the extension of e-β H1 to the corresponding symmetric Fock space is also of trace class and we are thus able to define a partition function Z, the operator density , the entropy S, and the average energy E. We prove that S and E tend to infinity if the cosmological constant tends to 0 and vanish if || tends to infinity. We also conjecture that E is the source of the dark matter and that the dark energy density is a multiple of the eigenvalue of with respect to the vacuum vector which is Z-1.