Stokes' theorem

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A checked version of this page, approved on 23 January 2012, was based off this revision.

In vector analysis and differential geometry, Stokes' theorem is a statement that treats integrations of differential forms.

[edit] Vector analysis formulation

In vector analysis Stokes' theorem is commonly written as

$\iint_S \,(\boldsymbol{\nabla}\times \mathbf{F})\cdot d\mathbf{S} = \oint_C \mathbf{F}\cdot d\mathbf{s}$

where ∇ × F is the curl of a vector field on $\scriptstyle \mathbb{R}^3$ , the vector dS is a vector normal to the surface element dS, the contour integral is over a closed, non-intersecting path C bounding the open, two-sided surface S. The direction of the vector dS is determined according to the right screw rule by the direction of integration along C.

[edit] Differential geometry formulation

In differential geometry the theorem is extended to integrals of exterior derivatives over oriented, compact, and differentiable manifolds of finite dimension. It can be written as $\int_c d\omega=\int_{\partial c} \omega$ , where $c$ is a singular cube, and $ω$ is a differential form.

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Stokes' theorem

[edit] Vector analysis formulation

[edit] Differential geometry formulation

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