Definition:Unit Tangent Bundle

Definition
Let $\struct {M, g}$ be a Riemannian manifold.

Let $T M$ be the tangent bundle of $\struct {M, g}$.

Let $p \in M$ be a point in $M$.

Let $\tuple {p, v}$ be a geometric tangent vector.

The unit tangent bundle $UTM \subseteq TM$ is the subset of unit vectors:


 * $UTM = \set {\tuple {p, v} \in TM : \norm v_g = 1}$