Category:Riemannian geometry

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In differential geometry, Riemannian geometry is the study of smooth manifolds with Riemannian metrics; i.e. a choice of positive-definite quadratic form on a manifold's tangent spaces which varies smoothly from point to point. This gives in particular local ideas of angle, length of curves, and volume. From those some other global quantities can be derived, by integrating local contributions.


Subcategories

There are 2 subcategories to this category shown below (more may be shown on subsequent pages).

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Pages in category "Riemannian geometry"

There are 92 pages in this section of this category.

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