How to tame your (black hole) saddles: Lessons from the Lorentzian Gravitational Path Integral

Abstract

We resolve a puzzle associated with the spherically-symmetric sector of the AdS4 Einstein-Maxwell partition function with inverse temperature β. Since charge is quantized, the semiclassical limit of the partition function is expected to be given by a sum over complex black hole solutions obtained by shifting the associated chemical potential μ by 2π i ne β in terms of the relevant charge quantum e. However, the sum over all such saddles turns out to diverge at any finite value of β. We therefore consider a definition of this partition function as an integral over a space of metrics that are real and of Lorentz-signature up to the presence of certain conical singularities. A Picard-Lefshetz analysis shows that only a finite subset of the above saddles contribute to our integral at finite β, and thus that the sum over such saddles converges. The low temperature limit is nonetheless associated with a convergent sum over all saddles that (as β → ∞) approach the usual large real Euclidean black holes. We also analyze the analogous partition function for the (uncharged) BTZ black hole in the ensemble defined by fixing an angular velocity up to shifts by 2π i ms β, where s=12 or s=1 depending on the presence of absence of fermionic states. In this case, at all β we find that all saddles contribute and that the sum over saddles converges. We also comment briefly on the apparent lack of utility of the so-called KSW condition in our context.

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