Preprint 91/2000

On the exact relativistic treatment of stationary counter-rotating dust disks III. Physical Properties

Jörg Frauendiener and Christian Klein

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Submission date: 08. Jan. 2001
Pages: 33
published in: Physical review / D, 63 (2001) 8, p. 084025/1-084025/17 
DOI number (of the published article): 10.1103/PhysRevD.63.084025
with the following different title: Exact relativistic treatment of stationary counterrotating dust disks
PACS-Numbers: 04.20.Jb, 02.10.Rn, 02.30.Jr
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This is the third in a series of papers on the construction of explicit solutions to the stationary axisymmetric Einstein equations which can be interpreted as counter-rotating disks of dust. We discuss the physical properties of a class of solutions to the Einstein equations for disks with constant angular velocity and constant relative density which was constructed in the first part. The metric for these spacetimes is given in terms of theta functions on a Riemann surface of genus 2. It is parameterized by two physical parameters, the central redshift and the relative density of the two counter-rotating streams in the disk. We discuss the dependence of the metric on these parameters using a combination of analytical and numerical methods. Interesting limiting cases are the Maclaurin disk in the Newtonian limit, the static limit which gives a solution of the Morgan and Morgan class and the limit of a disk without counter-rotation. We study the mass and the angular momentum of the spacetime. At the disk we discuss the energy-momentum tensor, i.e. the angular velocities of the dust streams and the energy density of the disk. The solutions have ergospheres in strongly relativistic situations. The ultrarelativistic limit of the solution in which the central redshift diverges is discussed in detail: In the case of two counter-rotating dust components in the disk, the solutions describe a disk with diverging central density but finite mass. In the case of a disk made up of one component, the exterior of the disks can be interpreted as the extreme Kerr solution.

28.01.2023, 02:11