Metric connection: Difference between revisions

Revision as of 06:59, 2 September 2007

This lives as an element of: the space of all connections, which in turn sits inside the space of all
$R$
-bilinear maps
$Γ (T M) \times Γ (E) \to Γ (E)$

Template:Connection property

Definition

Given data

A differential manifold $M$ .

A metric bundle $E$ over $M$ (viz, a vector bundle with a smoothly varying metric structure $g$ on each fibre of $E$ over $M$ ).

Definition part

A metric connection on $(M, g)$ is a connection $\nabla$ on the vector bundle $E$ over $M$ satisfying the following condition:

$X g (Y, Z) = g (\nabla_{X} Y, Z) + g (Y, \nabla_{X} Z)$

Here $X$ is a vector field (viz a section of $T M$ ) and $Y$ and $Z$ are sections of $E$ .

In other words, it is a connection such that the dual connection on the dual bundle to $E$ is the same as the connection obtained by the natural isomorphism between $E$ and its dual (induced by the metric).

We are in particular interested in metric linear connections, which are metric connections over the tangent bundle for a Riemannian manifold (viz, the tangent bundle is endowed with a Riemannian metric). Of these, a very special one is the Levi-Civita connection, which is the only torsion-free metric linear connection.

@@ Line 7: / Line 7: @@
 ===Given data===
-A [[Riemmanian manifold]] <math>(M,g)</math> (here, <math>M</math> is a [[differential manifold]] and <math>g</math> is the additional structure of a [[Riemannian metric]] on it).
+A [[differential manifold]] <math>M</math>.
-A vector bundle <math>E</math> over <math>M</math>, with a smoothly varying metric structure on eac hfibre of <math>E</math> over <math>M</math>.
+A [[metric bundle]] <math>E</math> over <math>M</math> (viz, a [[vector bundle]] with a smoothly varying metric structure <math>g</math> on each fibre of <math>E</math> over <math>M</math>).
 ===Definition part===
@@ Line 21: / Line 21: @@
 In other words, it is a connection such that the dual connection on the dual bundle to <math>E</math> is the same as the connection obtained by the natural isomorphism between <math>E</math> and its dual (induced by the metric).
-We are in particular interested in [[metric linear connection]]s, which are metric connections over the tangent bundle. Of these, a very special one is the [[Levi-Civita connection]], which is the only [[torsion-free linear connection|torsion-free]] metric linear connection.
+We are in particular interested in [[metric linear connection]]s, which are metric connections over the tangent bundle for a [[Riemannian manifold]] (viz, the tangent bundle is endowed with a [[Riemannian metric]]). Of these, a very special one is the [[Levi-Civita connection]], which is the only [[torsion-free linear connection|torsion-free]] metric linear connection.