Quantum-mechanical model of the Kerr-Newman black hole

TL;DR

This paper develops a quantum model of Kerr-Newman black holes, deriving a discrete spectrum for their physical properties and connecting it to Bekenstein's horizon area quantization proposal.

Contribution

It introduces a Hamiltonian quantum framework for Kerr-Newman black holes, resulting in a Schrödinger-like equation with discrete spectra for mass, charge, and angular momentum.

Findings

Black hole spectra are discrete and bounded from below.

The eigenvalues of mass, charge, and angular momentum scale as √n.

The results support Bekenstein's horizon area quantization hypothesis.

Abstract

We consider a Hamiltonian quantum theory of stationary spacetimes containing a Kerr-Newman black hole. The physical phase space of such spacetimes is just six-dimensional, and it is spanned by the mass $M$, the electric charge $Q$ and angular momentum $J$ of the hole, together with the corresponding canonical momenta. In this six-dimensional phase space we perform a canonical transformation such that the resulting configuration variables describe the dynamical properties of Kerr-Newman black holes in a natural manner. The classical Hamiltonian written in terms of these variables and their conjugate momenta is replaced by the corresponding self-adjoint Hamiltonian operator and an eigenvalue equation for the Arnowitt-Deser-Misner (ADM) mass of the hole, from the point of view of a distant observer at rest, is obtained. In a certain very restricted sense, this eigenvalue equation may be viewed as a sort of "Schr\"odinger equation of black holes". Our "Schr\"odinger equation" implies that the ADM mass, electric charge and angular momentum spectra of black holes are discrete, and the mass spectrum is bounded from below. Moreover, the spectrum of the quantity $M^2-Q^2-a^2$, where $a$ is the angular momentum per unit mass of the hole, is strictly positive when an appropriate self-adjoint extension is chosen. The WKB analysis yields the result that the large eigenvalues of $M$, $Q$ and $a$ are of the form $\sqrt{2n}$, where $n$ is an integer. It turns out that this result is closely related to Bekenstein's proposal on the discrete horizon area spectrum of black holes.