Innermost stable circular orbit

The case for rotating black holes is somewhat more complicated. The equatorial ISCO in the Kerr metric depends on whether the orbit is prograde (negative sign below) or retrograde (positive sign):

${\displaystyle r_{\mathrm {isco} }={\frac {GM}{c^{2}}}\left(3+Z_{2}\pm {\sqrt {(3-Z_{1})(3+Z_{1}+2Z_{2})}}\right)}$

where

${\displaystyle Z_{1}=1+{\sqrt[{3}]{1-x^{2}}}\left({\sqrt[{3}]{1+x}}+{\sqrt[{3}]{1-x}}\right)}$

${\displaystyle Z_{2}={\sqrt {3x^{2}+Z_{1}^{2}}}}$

with ${\displaystyle x=a/M}$ as the rotation parameter.[3] As the rotation rate of the black hole increases the retrograde ISCO increases towards ${\displaystyle 9GM/c^{2}}$ (4.5 times the a=0 horizon radius) while the prograde ISCO decreases towards the horizon radius and appears to merge with it for an extremal black hole (however, this later merger is illusory and an artefact of using Boyer-Lindquist coordinates [4]).

If the particle is also spinning there is a further split in ISCO radius depending on whether the spin is aligned with or against the black hole rotation.[5]

• Leo C. Stein, Kerr calculator V2