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In [[differential geometry]], the '''curvature form''' describes [[curvature]] of a [[connection form|connection]] on a [[principal bundle]]. It can be considered as an alternative to or generalization of [[Riemann curvature tensor|curvature tensor]] in [[Riemannian geometry]]. | |||
==Definition== | |||
Let ''G'' be a [[Lie group]] with [[Lie algebra]] <math>\mathfrak g</math>, and ''P'' → ''B'' be a [[principal bundle|principal ''G''-bundle]]. Let ω be an [[Ehresmann connection]] on ''P'' (which is a <math>\mathfrak g</math>-valued [[Differential form|one-form]] on ''P''). | |||
Then the '''curvature form''' is the <math>\mathfrak g</math>-valued 2-form on ''P'' defined by | |||
:<math>\Omega=d\omega +{1\over 2}[\omega,\omega]=D\omega.</math> | |||
Here <math>d</math> stands for [[exterior derivative]], <math>[\cdot,\cdot]</math> is defined by <math>[\alpha \otimes X, \beta \otimes Y] := \alpha \wedge \beta \otimes [X, Y]_\mathfrak{g}</math> and ''D'' denotes the [[exterior covariant derivative]]. In other terms, | |||
:<math>\,\Omega(X,Y)=d\omega(X,Y) + [\omega(X),\omega(Y)]. </math> | |||
===Curvature form in a vector bundle=== | |||
If ''E'' → ''B'' is a vector bundle. then one can also think of ω as | |||
a matrix of 1-forms and the above formula becomes the structure equation: | |||
:<math>\,\Omega=d\omega +\omega\wedge \omega, </math> | |||
where <math>\wedge</math> is the [[Exterior power|wedge product]]. More precisely, if <math>\omega^i_{\ j}</math> and <math>\Omega^i_{\ j}</math> denote components of ω and Ω correspondingly, (so each <math>\omega^i_{\ j}</math> is a usual 1-form and each <math>\Omega^i_{\ j}</math> is a usual 2-form) then | |||
:<math>\Omega^i_{\ j}=d\omega^i_{\ j} +\sum_k \omega^i_{\ k}\wedge\omega^k_{\ j}.</math> | |||
For example, for the [[tangent bundle]] of a [[Riemannian manifold]], the structure group is O(''n'') and Ω is a 2-form with values in O(''n''), the [[skew-symmetric matrix|antisymmetric matrices]]. In this case the form Ω is an alternative description of the [[Riemann curvature tensor|curvature tensor]], i.e. | |||
:<math>\,R(X,Y)=\Omega(X,Y),</math> | |||
using the standard notation for the Riemannian curvature tensor. | |||
==Bianchi identities== | |||
If <math>\theta</math> is the canonical vector-valued 1-form on the frame bundle, | |||
the [[Connection form#Torsion|torsion]] <math>\Theta</math> of the [[connection form]] | |||
<math>\omega</math> | |||
is the vector-valued 2-form defined by the structure equation | |||
:<math>\Theta=d\theta + \omega\wedge\theta = D\theta,</math> | |||
where as above ''D'' denotes the [[Connection form#Exterior covariant derivative|exterior covariant derivative]]. | |||
The first Bianchi identity takes the form | |||
:<math>D\Theta=\Omega\wedge\theta.</math> | |||
The second Bianchi identity takes the form | |||
:<math>\, D \Omega = 0 </math> | |||
and is valid more generally for any [[Connection form#Connection|connection]] in a [[principal bundle]]. | |||
==References== | |||
* [[Shoshichi Kobayashi]] and [[Katsumi Nomizu]] (1963) [[Foundations of Differential Geometry]], Vol.I, Chapter 2.5 Curvature form and structure equation, p 75, [[Wiley Interscience]]. | |||
==See also== | |||
*[[Connection (principal bundle)]] | |||
*[[Basic introduction to the mathematics of curved spacetime]] | |||
*[[Chern-Simons form]] | |||
*[[Curvature of Riemannian manifolds]] | |||
*[[Gauge theory]] | |||
{{curvature}} | |||
[[Category:Differential geometry]] | |||
[[Category:Curvature (mathematics)]] | |||
Revision as of 00:01, 3 January 2014
In differential geometry, the curvature form describes curvature of a connection on a principal bundle. It can be considered as an alternative to or generalization of curvature tensor in Riemannian geometry.
Definition
Let G be a Lie group with Lie algebra , and P → B be a principal G-bundle. Let ω be an Ehresmann connection on P (which is a -valued one-form on P).
Then the curvature form is the -valued 2-form on P defined by
Here stands for exterior derivative, is defined by and D denotes the exterior covariant derivative. In other terms,
Curvature form in a vector bundle
If E → B is a vector bundle. then one can also think of ω as a matrix of 1-forms and the above formula becomes the structure equation:
where is the wedge product. More precisely, if and denote components of ω and Ω correspondingly, (so each is a usual 1-form and each is a usual 2-form) then
For example, for the tangent bundle of a Riemannian manifold, the structure group is O(n) and Ω is a 2-form with values in O(n), the antisymmetric matrices. In this case the form Ω is an alternative description of the curvature tensor, i.e.
using the standard notation for the Riemannian curvature tensor.
Bianchi identities
If is the canonical vector-valued 1-form on the frame bundle, the torsion of the connection form is the vector-valued 2-form defined by the structure equation
where as above D denotes the exterior covariant derivative.
The first Bianchi identity takes the form
The second Bianchi identity takes the form
and is valid more generally for any connection in a principal bundle.
References
- Shoshichi Kobayashi and Katsumi Nomizu (1963) Foundations of Differential Geometry, Vol.I, Chapter 2.5 Curvature form and structure equation, p 75, Wiley Interscience.