Definition:Open Geodesic Ball in Riemannian Manifold

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Definition

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

Let $T_p M$ be the tangent space at $p \in M$.

Let $\exp_p$ be the restricted exponential map.

Let $\map {B_\epsilon} 0 \subseteq T_p M$ be the open ball in $T_p M$ with $\epsilon \in \R_{>0}$ such that $\exp_p$ is a diffeomorphism from $\map {B_\epsilon} 0$ to its image.


Then the image set $\map {\exp_p} {\map {B_\epsilon} 0 }$ is called the open geodesic ball in $M$.


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