Conjugate points
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In differential geometry, conjugate points are, roughly, points that can almost be joined by a 1-parameter family of geodesics. For example, on a sphere, the north-pole and south-pole are connected by any meridian.
[edit] Definition
Suppose p and q are points on a Riemannian manifold, and γ is a geodesic that connects p and q. Then p and q are conjugate points along γ if there exists a non-zero Jacobi field along γ that vanishes at p and q.
Recall that any Jacobi field can be written as the derivative of a geodesic variation (see the article on Jacobi fields). Therefore, if p and q are conjugate along γ, one can construct a family of geodesics which start at p and almost end at q. In particular, if γs(t) is the family of geodesics whose derivative in s at s = 0 generates the Jacobi field J, then the end point of the variation, namely γs(1), is the point q only up to first order in s. Therefore, if two points are conjugate, it is not necessary that there exist two distinct geodesics joining them.
[edit] Examples
- On the sphere S2, antipodal points are conjugate.
- On
, there are no conjugate points. - On Riemannian manifolds with non-positive sectional curvature, there are no conjugate points.
