Kruskal coordinates as canonical variables for Schwarzschild black holes
نویسنده
چکیده
We derive a transformation from the usual ADM metric-extrinsic curvature variables on the phase space of Schwarzschild black holes, to new canonical variables which have the interpretation of Kruskal coordinates. We explicitly show that this transformation is non-singular, even at the horizon. The constraints of the theory simplify in terms of the new canonical variables and are equivalent to the vanishing of the canonical momenta. Our work is based on earlier seminal work by Kuchař in which he reconstructed curvature coordinates and a mass function from spherically symmetric canonical data. The key feature in our construction of a nonsingular canonical transformation to Kruskal variables, is the scaling of the curvature coordinate variables by the mass function rather than by the mass at left spatial infinity.
منابع مشابه
Geometrodynamics of Schwarzschild black holes.
The curvature coordinates T, R of a Schwarzschild spacetime are turned into canonical coordinates T (r),R(r) on the phase space of spherically symmetric black holes. The entire dynamical content of the Hamiltonian theory is reduced to the constraints requiring that the momenta PT (r), PR(r) vanish. What remains is a conjugate pair of canonical variables m and p whose values are the same on ever...
متن کاملExotic Black Holes?
Exotic smooth manifolds, R ×Θ S , are constructed and discussed as possible space-time models supporting the usual Kruskal presentation of the vacuum Schwarzschild metric locally, but not globally. While having the same topology as the standard Kruskal model, none of these manifolds is diffeomorphic to standard Kruskal, although under certain conditions some global smooth Lorentz-signature metr...
متن کاملKruskal Dynamics for Radial Geodesics
The total spacetime manifold for a Schwarzschild black hole (BH) is believed to be described by the Kruskal coordinates and , where r and t are the conventional Schwarzschild radial and time coordinates respectively. The relationship between r and t for a test particle moving along a radial or non-radial geodesic is well known. Similarly, the expression for the vacuum Schwarzschild derivative f...
متن کاملInterior Dynamics of Neutral and Charged Black Holes in f(R) Gravity
In this paper, we explore the interior dynamics of neutral and charged black holes in f(R) gravity. We transform f(R) gravity from the Jordan frame into the Einstein frame and simulate scalar collapses in flat, Schwarzschild, and Reissner-Nordström geometries. In simulating scalar collapses in Schwarzschild and Reissner-Nordström geometries, Kruskal and Kruskal-like coordinates are used, respec...
متن کاملCoherent States for Black Holes
We determine coherent states peaked at classical space-time of the Schwarzschild black hole in the frame-work of canonical quantisation of general relativity. The information about the horizon is naturally encoded in the phase space variables, and the perturbative quantum fluctuations around the classical geometry depend on the distance from the horizon. For small black holes, space near the vi...
متن کامل