Curvature of a connection: Difference between revisions
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{{ | {{further|[[Riemann curvature tensor]]}} | ||
==Definition== | ==Definition== | ||
Revision as of 15:50, 8 April 2007
Further information: Riemann curvature tensor
Definition
Given data
- A connected differential manifold
- A vector bundle over
- A connection for
Definition part
The curvature of is defined as the map:
where
Note that itself outputs a linear map . We can thus write this as:
In the linear case
In the special case where , we have that . We can thus think of this map as a (1,3)-tensor because it takes as input three vector fields and outputs one vector field.
This is the famed Riemann curvature tensor that is important for its algebraic and differential properties.