By definition, a geodesic is a mapping $\gamma: I = (0, 1) \rightarrow M$ such that $\nabla_{\dot{\gamma}(t)} \dot{\gamma}(t) = 0$.
Here we only need the connection. So, we do not need a metric to define a geodesic? Is such kind of geodesic useful?
2026-04-24 22:12:32.1777068752
Geodesics without a metric
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