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Line 1: {{Refimprove\|date=March 2019}} In [[differential geometry]], '''conjugate points''' are, roughly, points that can almost be joined by a 1-parameter family of [[geodesic]]s. For example, on a [[Spherical geometry\|sphere]], the north-pole and south-pole are connected by any [[Meridian (geography)\|meridian]]. Another viewpoint is that conjugate points tell when the geodesics fail to be length-minimizing. Geodesics are locally length-minimizing, but, for example, on a sphere, any geodesic passing through the north-pole can be extended to reach the south-pole, and hence ~~are~~any geodesic segment connecting the poles is not (uniquely) ~~globally~~ length minimizing. <ref>Cheeger, Ebin. ''Comparison Theorems in Riemannian Geometry''. North-Holland Publishing Company, 1975, pp. 17-18.</ref> ==Definition==

Conjugate points: Difference between revisions