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In [[mathematics]], a '''metric connection''' is a [[connection (vector bundle)|connection]] in a [[vector bundle]] ''E'' equipped with a [[metric (vector bundle)|metric]]<!--Red link until someone wants to write an appropriate article. [[metric tensor]] isn't right.--> for which the [[inner product]] of any two vectors will remain the same when those vectors are [[parallel transport]]ed along any curve. Other common equivalent formulations of a metric connection include: | |||
* A connection for which the [[connection (vector bundle)|covariant derivative]]s of the metric on ''E'' vanish. | |||
* A [[connection (principal bundle)|principal connection]] on the bundle of [[orthonormal frame]]s of ''E''. | |||
A special case of a metric connection is the [[Levi-Civita connection]]. Here the bundle ''E'' is the [[tangent bundle]] of a manifold. In addition to being a metric connection, the Levi-Civita connection is required to be [[torsion tensor|torsion free]]. | |||
==Riemannian connections== | |||
An important special case of a metric connection is a '''Riemannian connection'''. This is a connection <math>\nabla</math> on the [[tangent bundle]] of a [[pseudo-Riemannian manifold]] (''M'', ''g'') such that <math>\nabla_X g = 0</math> for all vector fields ''X'' on ''M''. Equivalently, <math>\nabla</math> is Riemannian if the [[parallel transport]] it defines preserves the metric ''g''. | |||
A given connection <math>\nabla</math> is Riemannian if and only if | |||
:<math>Xg(Y,Z)=g(\nabla_XY,Z)+g(Y,\nabla_XZ) </math> | |||
for all vector fields ''X'', ''Y'' and ''Z'' on ''M'', where <math>Xg(Y,Z)</math> denotes the derivative of the function <math>g(Y,Z)</math> along this vector field <math>X</math>. | |||
The [[Levi-Civita connection]] is the [[torsion tensor|torsion-free]] Riemannian connection on a manifold. It is unique by the [[fundamental theorem of Riemannian geometry]]. | |||
==External links== | |||
*[http://projecteuclid.org/Dienst/UI/1.0/Summarize/euclid.cmp/1103858479 a pdf about this] | |||
[[Category:Connection (mathematics)]] | |||
[[Category:Riemannian geometry]] | |||
{{differential-geometry-stub}} | |||
Revision as of 11:54, 2 April 2013
In mathematics, a metric connection is a connection in a vector bundle E equipped with a metric for which the inner product of any two vectors will remain the same when those vectors are parallel transported along any curve. Other common equivalent formulations of a metric connection include:
- A connection for which the covariant derivatives of the metric on E vanish.
- A principal connection on the bundle of orthonormal frames of E.
A special case of a metric connection is the Levi-Civita connection. Here the bundle E is the tangent bundle of a manifold. In addition to being a metric connection, the Levi-Civita connection is required to be torsion free.
Riemannian connections
An important special case of a metric connection is a Riemannian connection. This is a connection on the tangent bundle of a pseudo-Riemannian manifold (M, g) such that for all vector fields X on M. Equivalently, is Riemannian if the parallel transport it defines preserves the metric g.
A given connection is Riemannian if and only if
for all vector fields X, Y and Z on M, where denotes the derivative of the function along this vector field .
The Levi-Civita connection is the torsion-free Riemannian connection on a manifold. It is unique by the fundamental theorem of Riemannian geometry.