The sphere of influence is a region around a supermassive black hole in which the gravitational potential of the black hole dominates the gravitational potential of the host galaxy. The radius of the sphere of influence is called the "(gravitational) influence radius".
There are two definitions in common use for the radius of the sphere of influence. The first[1] is given by [math]\displaystyle{ r_h = \frac{GM_\text{BH}}{\sigma^2} }[/math] where MBH is the mass of the black hole, σ is the stellar velocity dispersion of the host bulge, and G is the gravitational constant.
The second definition[2] is the radius at which the enclosed mass in stars equals twice MBH, i.e. [math]\displaystyle{ M_\star(r\lt r_h) = 2 M_\text{BH} . }[/math]
Which definition is most appropriate depends on the physical question that is being addressed. The first definition takes into account the bulge's overall effect on the motion of a star, since [math]\displaystyle{ \sigma }[/math] is determined in part by stars that have moved far from the black hole. The second definition compares the force from the black hole to the local force from the stars.
It is a minimum requirement that the sphere of influence be well resolved in order that the mass of the black hole be determined dynamically.[3]
If the black hole is rotating, there is a second radius of influence associated with the rotation.[4] This is the radius inside of which the Lense-Thirring torques from the black hole are larger than the Newtonian torques between stars. Inside the rotational influence sphere, stellar orbits precess at approximately the Lense-Thirring rate; while outside this sphere, orbits evolve predominantly in response to perturbations from stars on other orbits. Assuming that the Milky Way black hole is maximally rotating, its rotational influence radius is about 0.001 parsec,[5] while its radius of gravitational influence is about 3 parsecs.
Original source: https://en.wikipedia.org/wiki/Sphere of influence (black hole).
Read more |