Metric linear connection: Difference between revisions

Revision as of 23:12, 10 April 2008

Definition

Given data

A Riemannian manifold $(M,g)$ (i.e. a differential manifold $M$ endowed with a Riemannian metric $g$ ).

Definition part

A metric linear connection on $M$ is a linear connection $\nabla$ on $M$ satisfying the following condition:

$Xg(Y,Z)=g(\nabla _{X}Y,Z)+g(Y,\nabla _{X}Z)$

In other words, it is a metric connection on the tangent bundle.

An important case of a metric linear connection is the Levi-Civita connection which is the unique metric torsion-free linear connection.

Facts

Given a Riemannian manifold $M$ , a submanifold $N$ , and a metric linear connection on $M$ , the induced linear connection on the submanifold $N$ is also a metric connection.

For full proof, refer: Induced connection on submanifold of metric connection is metric

Revision as of 22:53, 10 April 2008 (view source) Vipul (talk \| contribs) No edit summary ← Older edit		Revision as of 23:12, 10 April 2008 (view source) Vipul (talk \| contribs) (→‎Facts) Newer edit →
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	Given a Riemannian manifold <math>M</math>, a submanifold <math>N</math>, and a metric linear connection on <math>M</math>, the induced linear connection on the submanifold <math>N</math> is also a metric connection.		Given a Riemannian manifold <math>M</math>, a submanifold <math>N</math>, and a metric linear connection on <math>M</math>, the induced linear connection on the submanifold <math>N</math> is also a metric connection.

	{{proofat\|[[~~Restriction~~ of metric ~~linear~~ connection is metric]]}}		{{proofat\|[[Induced connection on submanifold of metric connection is metric]]}}