Constant curvature explained

See also: space form, curvature of Riemannian manifolds and sectional curvature.

In mathematics, constant curvature is a concept from differential geometry. Here, curvature refers to the sectional curvature of a space (more precisely a manifold) and is a single number determining its local geometry.[1] The sectional curvature is said to be constant if it has the same value at every point and for every two-dimensional tangent plane at that point. For example, a sphere is a surface of constant positive curvature.

Classification

The Riemannian manifolds of constant curvature can be classified into the following three cases:

Properties

\nablaR=0

.
1
2

n(n+1)

number of local isometries, where

n

is its dimension.
1
2

n(n+1)

(global) isometries, has constant curvature.

Further reading

Notes and References

  1. Caminha . A. . 2006-07-01 . On spacelike hypersurfaces of constant sectional curvature lorentz manifolds . Journal of Geometry and Physics . 56 . 7 . 1144–1174 . 10.1016/j.geomphys.2005.06.007 . 0393-0440.