Calculus/Helmholtz Decomposition Theorem: Difference between revisions

Template:Calculus/Top Nav The Helmholtz Decomposition Theorem, regarded as the fundamental theorem of vector calculus, dictates that any vector field ${\displaystyle 𝐅}$ can be expressed as the sum of a conservative vector field ${\displaystyle 𝐆}$ and a divergence free vector field ${\displaystyle 𝐇}$: ${\displaystyle 𝐅=𝐆+𝐇}$.

Given a vector field ${\displaystyle 𝐅}$, the vector field ${\displaystyle 𝐆(𝐪)=\frac{1}{4\pi }\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{(\mathrm{\nabla }\cdot 𝐅){|}_{{𝐪}^{\prime }}(𝐪-{𝐪}^{\prime })}{|𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ has the same divergence as ${\displaystyle 𝐅}$, and is also conservative: ${\displaystyle \mathrm{\nabla }\cdot 𝐆=\mathrm{\nabla }\cdot 𝐅}$ and ${\displaystyle \mathrm{\nabla }\times 𝐆=\mathrm{𝟎}}$. The vector field ${\displaystyle 𝐇=𝐅-𝐆}$ is divergence free.

Therefore ${\displaystyle 𝐅=𝐆+𝐇}$ where ${\displaystyle 𝐆(𝐪)=\frac{1}{4\pi }\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{(\mathrm{\nabla }\cdot 𝐅){|}_{{𝐪}^{\prime }}(𝐪-{𝐪}^{\prime })}{|𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ and ${\displaystyle 𝐇=𝐅-𝐆}$. Vector field ${\displaystyle 𝐆}$ is conservative and ${\displaystyle 𝐇}$ is divergence free.

Given a vector field ${\displaystyle 𝐅}$, the vector field ${\displaystyle 𝐇(𝐪)=\frac{1}{4\pi }\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{(\mathrm{\nabla }\times 𝐅){|}_{{𝐪}^{\prime }}\times (𝐪-{𝐪}^{\prime })}{|𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ has the same curl as ${\displaystyle 𝐅}$, and is also divergence free: ${\displaystyle \mathrm{\nabla }\times 𝐇=\mathrm{\nabla }\times 𝐅}$ and ${\displaystyle \mathrm{\nabla }\cdot 𝐇=0}$. The vector field ${\displaystyle 𝐆=𝐅-𝐇}$ is conservative.

Therefore ${\displaystyle 𝐅=𝐆+𝐇}$ where ${\displaystyle 𝐇(𝐪)=\frac{1}{4\pi }\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{(\mathrm{\nabla }\times 𝐅){|}_{{𝐪}^{\prime }}\times (𝐪-{𝐪}^{\prime })}{|𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ and ${\displaystyle 𝐆=𝐅-𝐇}$. Vector field ${\displaystyle 𝐆}$ is conservative and ${\displaystyle 𝐇}$ is divergence free.

The Helmholtz decomposition can be derived as follows:

Given an arbitrary point ${\displaystyle {𝐪}^{\prime }}$, the divergence of the vector field ${\displaystyle \frac{𝐪-{𝐪}^{\prime }}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}}$ is ${\displaystyle {\mathrm{\nabla }}_{𝐪}\cdot \frac{𝐪-{𝐪}^{\prime }}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}=\delta (𝐪;{𝐪}^{\prime })}$ where ${\displaystyle \delta (𝐪;{𝐪}^{\prime })}$ is the Dirac delta function centered on ${\displaystyle {𝐪}^{\prime }}$ (The subscript ${}_{𝐪}$ clarifies that ${\displaystyle 𝐪}$ as opposed to ${\displaystyle {𝐪}^{\prime }}$ is the parameter that the differential operator is being applied to). Since ${\displaystyle {\mathrm{\nabla }}_{𝐪}(\frac{-1}{|𝐪-{𝐪}^{\prime }|})=\frac{𝐪-{𝐪}^{\prime }}{|𝐪-{𝐪}^{\prime }{|}^3}}$, it is the case that ${\displaystyle {\displaystyle \underset{𝐪}{\overset{2}{\mathrm{\nabla }}}}\frac{-1}{4\pi |𝐪-{𝐪}^{\prime }|}={\mathrm{\nabla }}_{𝐪}\cdot \frac{𝐪-{𝐪}^{\prime }}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}=\delta (𝐪;{𝐪}^{\prime })}$

Alongside the identities ${\displaystyle \mathrm{\nabla }\cdot (f𝐆)=(\mathrm{\nabla }f)\cdot 𝐆+f(\mathrm{\nabla }\cdot 𝐆)}$, and ${\displaystyle \mathrm{\nabla }\times (f𝐆)=(\mathrm{\nabla }f)\times 𝐆+f(\mathrm{\nabla }\times 𝐆)}$, and most importantly ${\displaystyle \mathrm{\nabla }\times (\mathrm{\nabla }\times 𝐅)=\mathrm{\nabla }(\mathrm{\nabla }\cdot 𝐅)-{\mathrm{\nabla }}^2𝐅}$, the following can be derived:

${\displaystyle 𝐅(𝐪)=\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\delta (𝐪;{𝐪}^{\prime })𝐅({𝐪}^{\prime })d{V}^{\prime }}$ ${\displaystyle =\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }({\displaystyle \underset{𝐪}{\overset{2}{\mathrm{\nabla }}}}\frac{-1}{4\pi |𝐪-{𝐪}^{\prime }|})𝐅({𝐪}^{\prime })d{V}^{\prime }}$ ${\displaystyle =\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }({\displaystyle \underset{𝐪}{\overset{2}{\mathrm{\nabla }}}}\frac{-𝐅({𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }|})d{V}^{\prime }}$

${\displaystyle =\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }({\mathrm{\nabla }}_{𝐪}({\mathrm{\nabla }}_{𝐪}\cdot \frac{-𝐅({𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }|})-{\mathrm{\nabla }}_{𝐪}\times ({\mathrm{\nabla }}_{𝐪}\times \frac{-𝐅({𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }|}))d{V}^{\prime }}$

${\displaystyle =\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }({\mathrm{\nabla }}_{𝐪}(\frac{(𝐪-{𝐪}^{\prime })\cdot 𝐅({𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3})-{\mathrm{\nabla }}_{𝐪}\times (\frac{(𝐪-{𝐪}^{\prime })\times 𝐅({𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}))d{V}^{\prime }}$

${\displaystyle ={\mathrm{\nabla }}_{𝐪}\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{𝐅({𝐪}^{\prime })\cdot (𝐪-{𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }+{\mathrm{\nabla }}_{𝐪}\times \underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{𝐅({𝐪}^{\prime })\times (𝐪-{𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$

${\displaystyle 𝐆(𝐪)={\mathrm{\nabla }}_{𝐪}\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{𝐅({𝐪}^{\prime })\cdot (𝐪-{𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ is the gradient of a scalar field, and so is conservative.

${\displaystyle 𝐇(𝐪)={\mathrm{\nabla }}_{𝐪}\times \underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{𝐅({𝐪}^{\prime })\times (𝐪-{𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ is the curl of a vector field, and so is divergence free.

In summary, ${\displaystyle 𝐅=𝐆+𝐇}$ where ${\displaystyle 𝐆(𝐪)={\mathrm{\nabla }}_{𝐪}\underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{𝐅({𝐪}^{\prime })\cdot (𝐪-{𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ is conservative and ${\displaystyle 𝐇(𝐪)={\mathrm{\nabla }}_{𝐪}\times \underset{{𝐪}^{\prime }\in {ℝ}^3}{\iiint }\frac{𝐅({𝐪}^{\prime })\times (𝐪-{𝐪}^{\prime })}{4\pi |𝐪-{𝐪}^{\prime }{|}^3}d{V}^{\prime }}$ is divergence free.

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