PlanetPhysics/Affine Parameter

Given a geodesic curve, an affine parameterization for that curve is a parameterization by a parameter ${\displaystyle t}$ such that the parametric equations for the curve satisfy the geodesic equation.

Put another way, if one picks a parameterization of a geodesic curve by an arbitrary parameter ${\displaystyle s}$ and sets ${\displaystyle u^{\mu }=dx^{\mu }/ds}$, then we have ${\displaystyle u^{\mu }\nabla _{\mu }u^{\nu }=f(s)u^{\nu }}$ for some function ${\displaystyle f}$. In general, the right hand side of this equation does not equal zero --- it is only zero in the special case where ${\displaystyle t}$ is an affine parameter.

The reason for the name "affine parameter" is that, if ${\displaystyle t_{1}}$ and ${\displaystyle t_{2}}$ are affine parameters for the same geodesic curve, then they are related by an affine transform, i.e. there exist constants ${\displaystyle a}$ and ${\displaystyle b}$ such that

${\displaystyle t_{1}=at_{2}+b}$

Conversely, if ${\displaystyle t}$ is an affine parameter, then ${\displaystyle at+b}$ is also an affine parameter.

From this it follows that an affine parameter ${\displaystyle t}$ is uniquely determined if we specify its value at two points on the geodesic or if we specify both its value and the value of ${\displaystyle dx^{\mu }/dt}$ at a single point of the geodesic.