Wolfgang Tichy


Orbits around Black Holes


The orbit of a test particle around a black hole of mass M and spin S does not depend on the particle's mass. Rather it is determined by the three constants of the motion E, Lz and C. Here E is the total energy per rest mass, Lz is the z-component of the angular momentum per rest mass and C is the Carter constant. In order to understand these constants let's look at the Newtonian limit. In this limit and using units where G=c=1, we would have

E = 1 + (1/2) [ (dr/dt)^2 + L^2/r^2 ] - M/r ,

where r is the distance form the center and where

L^2 = Lz^2 + C

is the total angular momentum.

Below are examples of geodesic orbits around a black hole. The black hole is located at the center of the coordinate system.

A Newtonian orbit (just for comparison)

Orbit around non-rotating (or Schwarzschild) black hole

Another Orbit around non-rotating (or Schwarzschild) black hole

Equatorial orbit around rotating (or Kerr) black hole

Generic orbit around rotating (or Kerr) black hole