Green's Theorem

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Green's Theorem is a vector identity that is equivalent to the curl theorem in two dimensions. It relates the line integral around a simple closed curve ${\displaystyle \partial \Omega }$ with the double integral over the plane region ${\displaystyle \Omega \,}$.

The theorem is named after the British mathematician George Green. It can be applied to various fields in physics, among others flow integrals.

Mathematical Statement in two dimensions

Let ${\displaystyle \Omega \,}$ be a region in ${\displaystyle \mathbb {R} ^{2}}$ with a positively oriented, piecewise smooth, simple closed boundary ${\displaystyle \partial \Omega }$. ${\displaystyle f(x,y)}$ and ${\displaystyle g(x,y)}$ are functions defined on a open region containing ${\displaystyle \Omega \,}$ and have continuous partial derivatives in that region. Then Green's Theorem states that

${\displaystyle \oint \limits _{\partial \Omega }(fdx+gdy)=\iint \limits _{\Omega }\left({\frac {\partial g}{\partial x}}-{\frac {\partial f}{\partial y}}\right)dxdy}$

The theorem is equivalent to the curl theorem in the plane and can be written in a more compact form as

${\displaystyle \oint \limits _{\partial \Omega }\mathbf {F} \cdot d\mathbf {S} =\iint \limits _{\Omega }(\nabla \times \mathbf {F} )d\mathbf {A} }$

Application: Area Calculation

Green's theorem is very useful when it comes to calculating the area of a region. If we take ${\displaystyle f(x,y)=y}$ and ${\displaystyle g(x,y)=x}$, the area of the region ${\displaystyle \Omega \,}$, with boundary ${\displaystyle \partial \Omega }$ can be calculated by

${\displaystyle A={\frac {1}{2}}\oint \limits _{\partial \Omega }xdy-ydx}$

This formula gives a relationship between the area of a region and the line integral around its boundary.

If the curve is parametrized as ${\displaystyle \left(x(t),y(t)\right)}$, the area formula becomes

${\displaystyle A={\frac {1}{2}}\oint \limits _{\partial \Omega }(xy'-x'y)dt}$

Statement in three dimensions

Different ways of formulating Green's theorem in three dimensions may be found. One of the more useful formulations is

${\displaystyle \iiint \limits _{V}{\Big (}\phi {\boldsymbol {\nabla }}^{2}\psi -\psi {\boldsymbol {\nabla }}^{2}\phi {\Big )}\,dV=\iint \limits _{\partial V}{\big (}\phi {\boldsymbol {\nabla }}\psi {\big )}\cdot d\mathbf {S} -\iint \limits _{\partial V}{\big (}\psi {\boldsymbol {\nabla }}\phi {\big )}\cdot d\mathbf {S} .}$

Proof

The divergence theorem reads

${\displaystyle \iiint \limits _{V}\nabla \cdot \mathbf {F} \,dV=\iint \limits _{\partial V}\mathbf {F} \cdot d\mathbf {S} }$

where ${\displaystyle d\mathbf {S} }$ is defined by ${\displaystyle d\mathbf {S} =\mathbf {n} \,dS}$ and ${\displaystyle \mathbf {n} }$ is the outward-pointing unit normal vector field.

Insert

${\displaystyle \mathbf {F} =\phi {\boldsymbol {\nabla }}\psi -\psi {\boldsymbol {\nabla }}\phi }$

and use

${\displaystyle {\begin{aligned}{\boldsymbol {\nabla }}\cdot \mathbf {F} &={\big (}{\boldsymbol {\nabla }}\phi {\big )}\cdot {\big (}{\boldsymbol {\nabla }}\psi {\big )}-{\big (}{\boldsymbol {\nabla }}\psi {\big )}\cdot {\big (}{\boldsymbol {\nabla }}\phi {\big )}+\phi {\boldsymbol {\nabla }}^{2}\psi -\psi {\boldsymbol {\nabla }}^{2}\phi \\&=\phi {\boldsymbol {\nabla }}^{2}\psi -\psi {\boldsymbol {\nabla }}^{2}\phi \end{aligned}}}$

so that we obtain the result to be proved,

${\displaystyle \iiint \limits _{V}\phi {\boldsymbol {\nabla }}^{2}\psi -\psi {\boldsymbol {\nabla }}^{2}\phi \,dV=\iint \limits _{\partial V}\phi {\boldsymbol {\nabla }}\psi \cdot d\mathbf {S} -\iint \limits _{\partial V}\psi {\boldsymbol {\nabla }}\phi \cdot d\mathbf {S} .}$