Curl Theorem

A special case of Stokes' Theorem in which is a Vector Field and is an oriented, compact embedded 2-Manifold with boundary in $\Bbb{R}^3$ , given by

$\begin{displaymath} \int_S(\nabla \times {\bf F})\cdot d{\bf a} = \int_{\partial S}{\bf F}\cdot d{\bf s}. \end{displaymath}$

(1)

There are also alternate forms. If

$\begin{displaymath} {\bf F} \equiv {\bf c}F, \end{displaymath}$

(2)

then

$\begin{displaymath} \int_S d{\bf a}\times \nabla F = \int_C Fd{\bf s}. \end{displaymath}$

(3)

and if

$\begin{displaymath} {\bf F} \equiv {\bf c}\times {\bf P}, \end{displaymath}$

(4)

then

$\begin{displaymath} \int_S (d{\bf a}\times \nabla)\times {\bf P} = \int_C d{\bf s}\times {\bf P}. \end{displaymath}$

(5)

References

Arfken, G. ``Stokes's Theorem.'' §1.12 in Mathematical Methods for Physicists, 3rd ed. Orlando, FL: Academic Press, pp. 61-64, 1985.