Gradient and Divergence in Orthonormal Curvilinear Coordinates

In rectangular coordinates (where $f=f(x,y,z)$), an infinitesimal length vector $d\overrightarrow{l}$ is given by

$d\overrightarrow{l}=dx\widehat{x}+dy\widehat{y}+dz\widehat{z}$

the gradient is given by

$\nabla ={\displaystyle \frac{\partial }{\partial x}}\widehat{x}+{\displaystyle \frac{\partial }{\partial y}}\widehat{y}+{\displaystyle \frac{\partial }{\partial z}}\widehat{z}$

and the differential change in the output is given by

$df=\nabla f\circ d\overrightarrow{l}={\displaystyle \frac{\partial f}{\partial x}}dx+{\displaystyle \frac{\partial f}{\partial y}}dy+{\displaystyle \frac{\partial f}{\partial z}}dz$

Similarly in orthonormal curvilinear coordinates ( where $f=f(q_1,q_2,q_3)$), the infinitesimal length vector is given by¹¹See my article Unit Vectors in Curvilinear Coordinates for an insight into this expression.

$d\overrightarrow{l}=h_{1}d{q}_1{\widehat{q}}_1+h_{2}d{q}_2{\widehat{q}}_2+h_{3}d{q}_3{\widehat{q}}_3$

where

$h_i=\sqrt{{\displaystyle \sum _k}{\left({\displaystyle \frac{\partial {\overrightarrow{x}}_k}{\partial q_i}}\right)}^2}\text{ and }{\widehat{q}}_i={\displaystyle \frac{1}{h_i}}\left({\displaystyle \frac{\partial {\overrightarrow{x}}_k}{\partial q_i}}\right)\text{ for }i\in 1,2,3$

So if

$\nabla =\alpha {\displaystyle \frac{\partial }{\partial q_1}}{\widehat{q}}_1+\beta {\displaystyle \frac{\partial }{\partial q_2}}{\widehat{q}}_2+\gamma {\displaystyle \frac{\partial }{\partial q_3}}{\widehat{q}}_3$

then since we know that

$df={\displaystyle \frac{\partial f}{\partial q_1}}d{q}_1+{\displaystyle \frac{\partial f}{\partial q_2}}d{q}_2+{\displaystyle \frac{\partial f}{\partial q_3}}d{q}_3$

and

$df=\nabla F\circ d\overrightarrow{l}=\alpha h_1{\displaystyle \frac{\partial f}{\partial q_1}}d{q}_1+\beta h_2{\displaystyle \frac{\partial f}{\partial q_2}}d{q}_2+\gamma h_3{\displaystyle \frac{\partial f}{\partial q_3}}d{q}_3$

this implies that

$\alpha ={\displaystyle \frac{1}{h_i}};\beta ={\displaystyle \frac{1}{h_2}};\gamma ={\displaystyle \frac{1}{h_3}}$

Hence,

	$\nabla$	$=$	${\displaystyle \frac{1}{h_1}}{\displaystyle \frac{\partial }{\partial q_1}}{\widehat{q}}_1+{\displaystyle \frac{1}{h_2}}{\displaystyle \frac{\partial }{\partial q_2}}{\widehat{q}}_2+{\displaystyle \frac{1}{h_3}}{\displaystyle \frac{\partial }{\partial q_3}}{\widehat{q}}_3$
		$=$	${\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial }{\partial q_i}}{\widehat{q}}_i$

In the previous section we concluded that in curvilinear coordinates, the gradient operator $\nabla$ is given by

$\nabla ={\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial }{\partial q_i}}{\widehat{q}}_i$

Then for $\overrightarrow{F}=F_1{\widehat{q}}_1+F_2{\widehat{q}}_2+F_3{\widehat{q}}_3$, the divergence of $\overrightarrow{F}$ is given by

$\nabla \circ \overrightarrow{F}=\left({\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial }{\partial q_i}}{\widehat{q}}_i\right)\circ \overrightarrow{F}$

which is not equal to

$\left({\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial }{\partial q_i}}{\widehat{q}}_i\right)\circ \overrightarrow{F}\ne {\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial F_i}{\partial q_i}}$

as one would think! The real expression can be derived the following way,

	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial }{\partial q_i}}{\widehat{q}}_i\right)\circ \overrightarrow{F}\right]$
	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ \left({\displaystyle \frac{\partial \overrightarrow{F}}{\partial q_i}}\right)\right]$
	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ \left({\displaystyle \frac{\partial }{\partial q_i}}\left({\displaystyle \sum _j}{F}_j{\widehat{q}}_j\right)\right)\right]$

	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ \left({\displaystyle \sum _j}{\displaystyle \frac{\partial }{\partial q_i}}\left(F_j{\widehat{q}}_j\right)\right)\right]$
	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ \left({\displaystyle \sum _j}{\widehat{q}}_j{\displaystyle \frac{\partial F_j}{\partial q_i}}+F_j{\displaystyle \frac{\partial {\widehat{q}}_j}{\partial q_i}}\right)\right]$

	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ \left({\displaystyle \sum _j}{\widehat{q}}_j{\displaystyle \frac{\partial F_j}{\partial q_i}}+{\displaystyle \sum _j}{F}_j{\displaystyle \frac{\partial {\widehat{q}}_j}{\partial q_i}}\right)\right]$
	$={\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{\widehat{q}}_j{\displaystyle \frac{\partial F_j}{\partial q_i}}+\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{F}_j{\displaystyle \frac{\partial {\widehat{q}}_j}{\partial q_i}}\right]$

$=\underset{\text{call it A}}{\underbrace{{\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{\widehat{q}}_j{\displaystyle \frac{\partial F_j}{\partial q_i}}\right]}}+\underset{\text{call it B}}{\underbrace{{\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{F}_j{\displaystyle \frac{\partial {\widehat{q}}_j}{\partial q_i}}\right]}}$

	$A$	$=$	${\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{\widehat{q}}_j{\displaystyle \frac{\partial F_j}{\partial q_i}}\right]$
		$=$	${\displaystyle \sum _i}\left[{\displaystyle \frac{1}{h_i}}{\displaystyle \sum _j}\underset{{\delta }_{ij}}{\underbrace{({\widehat{q}}_i\circ {\widehat{q}}_j)}}{\displaystyle \frac{\partial F_j}{\partial q_i}}\right]$
		$=$	${\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial F_i}{\partial q_i}}$

$B$

$=$

${\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{F}_j{\displaystyle \frac{\partial {\widehat{q}}_j}{\partial q_i}}\right]$

Using the following equality²²The proof of this identity is left as an exercise for the reader.

${\displaystyle \frac{\partial {\widehat{q}}_j}{\partial q_i}}={\displaystyle \frac{{\widehat{q}}_i}{h_j}}{\displaystyle \frac{\partial h_i}{\partial q_j}}\mathit{\hspace{1em}\hspace{1em}}\forall i\ne j$

we can write $B$ as

	$B$	$=$	${\displaystyle \sum _i}\left[\left({\displaystyle \frac{1}{h_i}}{\widehat{q}}_i\right)\circ {\displaystyle \sum _j}{F}_j\left({\widehat{q}}_i{\displaystyle \frac{1}{h_j}}{\displaystyle \frac{\partial h_i}{\partial q_j}}\right)\right]\mathit{\hspace{1em}\hspace{1em}}\forall i\ne j$
		$=$	${\displaystyle \sum _i}\left[{\displaystyle \frac{1}{h_i}}{\displaystyle \sum _j}{F}_j\underset{1}{\underbrace{({\widehat{q}}_i\circ {\widehat{q}}_i)}}{\displaystyle \frac{1}{h_j}}{\displaystyle \frac{\partial h_i}{\partial q_j}}\right]\mathit{\hspace{1em}\hspace{1em}}\forall i\ne j$
		$=$	${\displaystyle \sum _i}\left[{\displaystyle \frac{1}{h_i}}{\displaystyle \sum _j}{F}_j{\displaystyle \frac{1}{h_j}}{\displaystyle \frac{\partial h_i}{\partial q_j}}\right]\mathit{\hspace{1em}\hspace{1em}}\forall i\ne j$
		$=$	${\displaystyle \sum _{i\ne j}}{\displaystyle \frac{F_j}{h_j{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_j}}$
		$=$	${\displaystyle \sum _{i\ne 1}}{\displaystyle \frac{F_1}{h_1{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_1}}+{\displaystyle \sum _{i\ne 2}}{\displaystyle \frac{F_2}{h_2{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_2}}+{\displaystyle \sum _{i\ne 3}}{\displaystyle \frac{F_3}{h_3{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_3}}$

	$\Rightarrow \nabla \circ \overrightarrow{F}$	$=$	$A+B$
		$=$	${\displaystyle \sum _i}{\displaystyle \frac{1}{h_i}}{\displaystyle \frac{\partial F_i}{\partial q_i}}+{\displaystyle \sum _{i\ne 1}}{\displaystyle \frac{F_1}{h_1{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_1}}+{\displaystyle \sum _{i\ne 2}}{\displaystyle \frac{F_2}{h_2{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_2}}+{\displaystyle \sum _{i\ne 3}}{\displaystyle \frac{F_3}{h_3{h}_i}}{\displaystyle \frac{\partial h_i}{\partial q_3}}$
		$=$	$\left[{\displaystyle \frac{1}{h_1}}{\displaystyle \frac{\partial F_1}{\partial q_1}}+{\displaystyle \frac{1}{h_2}}{\displaystyle \frac{\partial F_2}{\partial q_2}}+{\displaystyle \frac{1}{h_3}}{\displaystyle \frac{\partial F_3}{\partial q_3}}\right]$
			$+\left[{\displaystyle \frac{F_1}{h_1{h}_2}}{\displaystyle \frac{\partial h_2}{\partial q_1}}+{\displaystyle \frac{F_1}{h_1{h}_3}}{\displaystyle \frac{\partial h_3}{\partial q_1}}\right]$
			$+\left[{\displaystyle \frac{F_2}{h_2{h}_1}}{\displaystyle \frac{\partial h_1}{\partial q_2}}+{\displaystyle \frac{F_2}{h_2{h}_3}}{\displaystyle \frac{\partial h_3}{\partial q_2}}\right]$
			$+\left[{\displaystyle \frac{F_3}{h_3{h}_1}}{\displaystyle \frac{\partial h_1}{\partial q_3}}+{\displaystyle \frac{F_3}{h_3{h}_2}}{\displaystyle \frac{\partial h_2}{\partial q_3}}\right]$

Collecting similar terms together we get,

	$\nabla \circ \overrightarrow{F}$	$=$	$\left[{\displaystyle \frac{1}{h_1}}{\displaystyle \frac{\partial F_1}{\partial q_1}}+{\displaystyle \frac{F_1}{h_1{h}_2}}{\displaystyle \frac{\partial h_2}{\partial q_1}}+{\displaystyle \frac{F_1}{h_1{h}_3}}{\displaystyle \frac{\partial h_3}{\partial q_1}}\right]$
			$+\left[{\displaystyle \frac{1}{h_2}}{\displaystyle \frac{\partial F_2}{\partial q_2}}+{\displaystyle \frac{F_2}{h_2{h}_1}}{\displaystyle \frac{\partial h_1}{\partial q_2}}+{\displaystyle \frac{F_2}{h_2{h}_3}}{\displaystyle \frac{\partial h_3}{\partial q_2}}\right]$
			$+\left[{\displaystyle \frac{1}{h_3}}{\displaystyle \frac{\partial F_3}{\partial q_3}}+{\displaystyle \frac{F_3}{h_3{h}_1}}{\displaystyle \frac{\partial h_1}{\partial q_3}}+{\displaystyle \frac{F_3}{h_3{h}_2}}{\displaystyle \frac{\partial h_2}{\partial q_3}}\right]$

If we define $\mathrm{\Omega }\equiv {\mathrm{\Pi }}_i{h}_i$, we can further write the above expression as

	$\nabla \circ \overrightarrow{F}$	$=$	$\left[{\displaystyle \frac{h_2{h}_3}{\mathrm{\Omega }}}{\displaystyle \frac{\partial F_1}{\partial q_1}}+{\displaystyle \frac{F_1{h}_3}{\mathrm{\Omega }}}{\displaystyle \frac{\partial h_2}{\partial q_1}}+{\displaystyle \frac{F_1{h}_2}{\mathrm{\Omega }}}{\displaystyle \frac{\partial h_3}{\partial q_1}}\right]$
			$+\left[{\displaystyle \frac{h_1{h}_3}{\mathrm{\Omega }}}{\displaystyle \frac{\partial F_2}{\partial q_2}}+{\displaystyle \frac{F_2{h}_3}{\mathrm{\Omega }}}{\displaystyle \frac{\partial h_1}{\partial q_2}}+{\displaystyle \frac{h_1{F}_2}{\mathrm{\Omega }}}{\displaystyle \frac{\partial h_3}{\partial q_2}}\right]$
			$+\left[{\displaystyle \frac{h_1{h}_2}{\mathrm{\Omega }}}{\displaystyle \frac{\partial F_3}{\partial q_3}}+{\displaystyle \frac{h_2{F}_3}{\mathrm{\Omega }}}{\displaystyle \frac{\partial h_1}{\partial q_3}}+{\displaystyle \frac{h_1{F}_3}{\mathrm{\Omega }}}{\displaystyle \frac{\partial h_2}{\partial q_3}}\right]$
		$=$	${\displaystyle \frac{1}{\mathrm{\Omega }}}([{\displaystyle \frac{\partial F_1}{\partial q_1}}{h}_2{h}_3+F_1{h}_3{\displaystyle \frac{\partial h_2}{\partial q_1}}+F_1{h}_2{\displaystyle \frac{\partial h_3}{\partial q_1}}]$
			$+\left[h_1{\displaystyle \frac{\partial F_2}{\partial q_2}}{h}_3+{\displaystyle \frac{\partial h_1}{\partial q_2}}{F}_2{h}_3+h_1{F}_2{\displaystyle \frac{\partial h_3}{\partial q_2}}\right]$
			$+[h_1{h}_2{\displaystyle \frac{\partial F_3}{\partial q_3}}+{\displaystyle \frac{\partial h_1}{\partial q_3}}{h}_2{F}_3+h_1{\displaystyle \frac{\partial h_2}{\partial q_3}}{F}_3])$
		$=$	${\displaystyle \frac{1}{\mathrm{\Omega }}}\left({\displaystyle \frac{\partial }{\partial q_1}}(F_1{h}_2{h}_3)+{\displaystyle \frac{\partial }{\partial q_2}}(h_1{F}_2{h}_3)+{\displaystyle \frac{\partial }{\partial q_3}}(h_1{h}_2{F}_3)\right)$

Hence,

$\nabla \circ \overrightarrow{F}$

$=$

${\displaystyle \frac{1}{\mathrm{\Omega }}}{\displaystyle \sum _i}{\displaystyle \frac{\partial }{\partial q_i}}\left({\displaystyle \frac{\mathrm{\Omega }}{h_i}}{F}_i\right)\mathit{\hspace{1em}}\text{ where }\mathrm{\Omega }={\mathrm{\Pi }}_i{h}_i$