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[10414]	1	\documentclass[../main/NEMO_manual]{subfiles}
	2
[6997]	3	\begin{document}
[11543]	4	\chapter{Diffusive Operators}
	5	\label{apdx:DIFFOPERS}
[10414]	6
[11435]	7	\chaptertoc
[707]	8
[11597]	9	%% =================================================================================================
[9393]	10	\section{Horizontal/Vertical $2^{nd}$ order tracer diffusive operators}
[11543]	11	\label{sec:DIFFOPERS_1}
[707]	12
[11597]	13	%% =================================================================================================
[3294]	14	\subsubsection*{In z-coordinates}
[10414]	15
[10354]	16	In $z$-coordinates, the horizontal/vertical second order tracer diffusion operator is given by:
[10414]	17	\begin{align}
[11543]	18	\label{eq:DIFFOPERS_1}
[10414]	19	&D^T = \frac{1}{e_1 \, e_2} \left[
	20	\left. \frac{\partial}{\partial i} \left( \frac{e_2}{e_1}A^{lT} \;\left. \frac{\partial T}{\partial i} \right\|_z \right) \right\|_z \right.
	21	\left.
	22	+ \left. \frac{\partial}{\partial j} \left( \frac{e_1}{e_2}A^{lT} \;\left. \frac{\partial T}{\partial j} \right\|_z \right) \right\|_z \right]
	23	+ \frac{\partial }{\partial z}\left( {A^{vT} \;\frac{\partial T}{\partial z}} \right)
[10406]	24	\end{align}
[707]	25
[11597]	26	%% =================================================================================================
[3294]	27	\subsubsection*{In generalized vertical coordinates}
[10414]	28
[11543]	29	In $s$-coordinates, we defined the slopes of $s$-surfaces, $\sigma_1$ and $\sigma_2$ by \autoref{eq:SCOORD_s_slope} and
[10354]	30	the vertical/horizontal ratio of diffusion coefficient by $\epsilon = A^{vT} / A^{lT}$.
	31	The diffusion operator is given by:
[707]	32
[10414]	33	\begin{equation}
[11543]	34	\label{eq:DIFFOPERS_2}
[10414]	35	D^T = \left. \nabla \right\|_s \cdot
	36	\left[ A^{lT} \;\Re \cdot \left. \nabla \right\|_s T \right] \\
	37	\;\;\text{where} \;\Re =\left( {{
	38	\begin{array}{*{20}c}
	39	1 \hfill & 0 \hfill & {-\sigma_1 } \hfill \\
	40	0 \hfill & 1 \hfill & {-\sigma_2 } \hfill \\
	41	{-\sigma_1 } \hfill & {-\sigma_2 } \hfill & {\varepsilon +\sigma_1
	42	^2+\sigma_2 ^2} \hfill \\
	43	\end{array}
	44	}} \right)
[707]	45	\end{equation}
[1223]	46	or in expanded form:
[10414]	47	\begin{align*}
	48	{
	49	\begin{array}{*{20}l}
[11335]	50	D^T= \frac{1}{e_1\,e_2\,e_3 } & \left\{ \quad \quad \frac{\partial }{\partial i} \left. \left[ e_2\,e_3 \, A^{lT}
[11543]	51	\left( \ \frac{1}{e_1}\; \left. \frac{\partial T}{\partial i} \right\|_s
[11335]	52	-\frac{\sigma_1 }{e_3 } \; \frac{\partial T}{\partial s} \right) \right] \right\|_s \right. \\
	53	& \quad \ + \ \left. \frac{\partial }{\partial j} \left. \left[ e_1\,e_3 \, A^{lT}
[11543]	54	\left( \ \frac{1}{e_2 }\; \left. \frac{\partial T}{\partial j} \right\|_s
[11335]	55	-\frac{\sigma_2 }{e_3 } \; \frac{\partial T}{\partial s} \right) \right] \right\|_s \right. \\
[11543]	56	& \quad \ + \ \left. e_1\,e_2\, \frac{\partial }{\partial s} \left[ A^{lT} \; \left(
	57	-\frac{\sigma_1 }{e_1 } \; \left. \frac{\partial T}{\partial i} \right\|_s
	58	-\frac{\sigma_2 }{e_2 } \; \left. \frac{\partial T}{\partial j} \right\|_s
[11335]	59	+\left( \varepsilon +\sigma_1^2+\sigma_2 ^2 \right) \; \frac{1}{e_3 } \; \frac{\partial T}{\partial s} \right) \; \right] \; \right\} .
[10414]	60	\end{array}
	61	}
[2282]	62	\end{align*}
[707]	63
[11543]	64	\autoref{eq:DIFFOPERS_2} is obtained from \autoref{eq:DIFFOPERS_1} without any additional assumption.
[10354]	65	Indeed, for the special case $k=z$ and thus $e_3 =1$,
[11543]	66	we introduce an arbitrary vertical coordinate $s = s (i,j,z)$ as in \autoref{apdx:SCOORD} and
[11558]	67	use \autoref{eq:SCOORD_s_slope} and \autoref{eq:SCOORD_s_chain_rule1}.
[11543]	68	Since no cross horizontal derivative $\partial _i \partial _j $ appears in \autoref{eq:DIFFOPERS_1},
[10354]	69	the ($i$,$z$) and ($j$,$z$) planes are independent.
	70	The derivation can then be demonstrated for the ($i$,$z$)~$\to$~($j$,$s$) transformation without
	71	any loss of generality:
[707]	72
[10414]	73	\begin{align*}
	74	{
	75	\begin{array}{*{20}l}
	76	D^T&=\frac{1}{e_1\,e_2} \left. {\frac{\partial }{\partial i}\left( {\frac{e_2}{e_1}A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_z } \right)} \right\|_z
	77	+\frac{\partial }{\partial z}\left( {A^{vT}\;\frac{\partial T}{\partial z}} \right) \\ \\
	78	%
	79	&=\frac{1}{e_1\,e_2 }\left[ {\left. {\;\frac{\partial }{\partial i}\left( {\frac{e_2}{e_1}A^{lT}\;\left( {\left. {\frac{\partial T}{\partial i}} \right\|_s
	80	-\frac{e_1\,\sigma_1 }{e_3 }\frac{\partial T}{\partial s}} \right)} \right)} \right\|_s } \right. \\
	81	& \qquad \qquad \left. { -\frac{e_1\,\sigma_1 }{e_3 }\frac{\partial }{\partial s}\left( {\frac{e_2 }{e_1 }A^{lT}\;\left. {\left( {\left. {\frac{\partial T}{\partial i}} \right\|_s -\frac{e_1 \,\sigma_1 }{e_3 }\frac{\partial T}{\partial s}} \right)} \right\|_s } \right)\;} \right]
	82	\shoveright{ +\frac{1}{e_3 }\frac{\partial }{\partial s}\left[ {\frac{A^{vT}}{e_3 }\;\frac{\partial T}{\partial s}} \right]} \qquad \qquad \qquad \\ \\
	83	%
	84	&=\frac{1}{e_1 \,e_2 \,e_3 }\left[ {\left. {\;\;\frac{\partial }{\partial i}\left( {\frac{e_2 \,e_3 }{e_1 }A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right)} \right\|_s -\left. {\frac{e_2 }{e_1}A^{lT}\;\frac{\partial e_3 }{\partial i}} \right\|_s \left. {\frac{\partial T}{\partial i}} \right\|_s } \right. \\
	85	& \qquad \qquad \quad \left. {-e_3 \frac{\partial }{\partial i}\left( {\frac{e_2 \,\sigma_1 }{e_3 }A^{lT}\;\frac{\partial T}{\partial s}} \right)} \right\|_s -e_1 \,\sigma_1 \frac{\partial }{\partial s}\left( {\frac{e_2 }{e_1 }A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right) \\
	86	& \qquad \qquad \quad \shoveright{ -e_1 \,\sigma_1 \frac{\partial }{\partial s}\left( {-\frac{e_2 \,\sigma_1 }{e_3 }A^{lT}\;\frac{\partial T}{\partial s}} \right)\;\,\left. {+\frac{\partial }{\partial s}\left( {\frac{e_1 \,e_2 }{e_3 }A^{vT}\;\frac{\partial T}{\partial s}} \right)\quad} \right] }\\
	87	\end{array}
	88	} \\
	89	%
	90	{
	91	\begin{array}{*{20}l}
[11335]	92	\intertext{Noting that $\frac{1}{e_1} \left. \frac{\partial e_3 }{\partial i} \right\|_s = \frac{\partial \sigma_1 }{\partial s}$, this becomes:}
[10414]	93	%
[11335]	94	D^T & =\frac{1}{e_1\,e_2\,e_3 }\left[ {\left. {\;\;\;\frac{\partial }{\partial i}\left( {\frac{e_2\,e_3 }{e_1}\,A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right)} \right\|_s \left. -\, {e_3 \frac{\partial }{\partial i}\left( {\frac{e_2 \,\sigma_1 }{e_3 }A^{lT}\;\frac{\partial T}{\partial s}} \right)} \right\|_s } \right. \\
[10414]	95	& \qquad \qquad \quad -e_2 A^{lT}\;\frac{\partial \sigma_1 }{\partial s}\left. {\frac{\partial T}{\partial i}} \right\|_s -e_1 \,\sigma_1 \frac{\partial }{\partial s}\left( {\frac{e_2 }{e_1 }A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right) \\
[11331]	96	& \qquad \qquad \quad\shoveright{ \left. { +e_1 \,\sigma_1 \frac{\partial }{\partial s}\left( {\frac{e_2 \,\sigma_1 }{e_3 }A^{lT}\;\frac{\partial T}{\partial s}} \right)+\frac{\partial }{\partial s}\left( {\frac{e_1 \,e_2 }{e_3 }A^{vT}\;\frac{\partial T}{\partial s}} \right)\;\;\;} \right] }\\
[10414]	97	\\
	98	&=\frac{1}{e_1 \,e_2 \,e_3 } \left[ {\left. {\;\;\;\frac{\partial }{\partial i} \left( {\frac{e_2 \,e_3 }{e_1 }A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right)} \right\|_s \left. {-\frac{\partial }{\partial i}\left( {e_2 \,\sigma_1 A^{lT}\;\frac{\partial T}{\partial s}} \right)} \right\|_s } \right. \\
	99	& \qquad \qquad \quad \left. {+\frac{e_2 \,\sigma_1 }{e_3}A^{lT}\;\frac{\partial T}{\partial s} \;\frac{\partial e_3 }{\partial i}} \right\|_s -e_2 A^{lT}\;\frac{\partial \sigma_1 }{\partial s}\left. {\frac{\partial T}{\partial i}} \right\|_s \\
	100	& \qquad \qquad \quad-e_2 \,\sigma_1 \frac{\partial}{\partial s}\left( {A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right)+\frac{\partial }{\partial s}\left( {\frac{e_1 \,e_2 \,\sigma_1 ^2}{e_3 }A^{lT}\;\frac{\partial T}{\partial s}} \right) \\
[11335]	101	& \qquad \qquad \quad\shoveright{ \left. {-\frac{\partial \left( {e_1 \,e_2 \,\sigma_1 } \right)}{\partial s} \left( {\frac{\sigma_1 }{e_3}A^{lT}\;\frac{\partial T}{\partial s}} \right) + \frac{\partial }{\partial s}\left( {\frac{e_1 \,e_2 }{e_3 }A^{vT}\;\frac{\partial T}{\partial s}} \right)\;\;\;} \right]} .
[10414]	102	\end{array}
	103	} \\
	104	{
	105	\begin{array}{*{20}l}
	106	%
[11335]	107	\intertext{Using the same remark as just above, $D^T$ becomes:}
[10414]	108	%
[11335]	109	D^T &= \frac{1}{e_1 \,e_2 \,e_3 } \left[ {\left. {\;\;\;\frac{\partial }{\partial i} \left( {\frac{e_2 \,e_3 }{e_1 }A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s -e_2 \,\sigma_1 A^{lT}\;\frac{\partial T}{\partial s}} \right)} \right\|_s } \right.\;\;\; \\
[10414]	110	& \qquad \qquad \quad+\frac{e_1 \,e_2 \,\sigma_1 }{e_3 }A^{lT}\;\frac{\partial T}{\partial s}\;\frac{\partial \sigma_1 }{\partial s} - \frac {\sigma_1 }{e_3} A^{lT} \;\frac{\partial \left( {e_1 \,e_2 \,\sigma_1 } \right)}{\partial s}\;\frac{\partial T}{\partial s} \\
	111	& \qquad \qquad \quad-e_2 \left( {A^{lT}\;\frac{\partial \sigma_1 }{\partial s}\left. {\frac{\partial T}{\partial i}} \right\|_s +\frac{\partial }{\partial s}\left( {\sigma_1 A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right)-\frac{\partial \sigma_1 }{\partial s}\;A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s } \right) \\
[11335]	112	& \qquad \qquad \quad\shoveright{\left. {+\frac{\partial }{\partial s}\left( {\frac{e_1 \,e_2 \,\sigma_1 ^2}{e_3 }A^{lT}\;\frac{\partial T}{\partial s}+\frac{e_1 \,e_2}{e_3 }A^{vT}\;\frac{\partial T}{\partial s}} \right)\;\;\;} \right] . }
[10414]	113	\end{array}
	114	} \\
	115	{
	116	\begin{array}{*{20}l}
	117	%
	118	\intertext{Since the horizontal scale factors do not depend on the vertical coordinate,
[11331]	119	the two terms on the second line cancel, while
	120	the third line reduces to a single vertical derivative, so it becomes:}
[10414]	121	%
[11335]	122	D^T & =\frac{1}{e_1 \,e_2 \,e_3 }\left[ {\left. {\;\;\;\frac{\partial }{\partial i}\left( {\frac{e_2 \,e_3 }{e_1 }A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s -e_2 \,\sigma_1 \,A^{lT}\;\frac{\partial T}{\partial s}} \right)} \right\|_s } \right. \\
[10414]	123	& \qquad \qquad \quad \shoveright{ \left. {+\frac{\partial }{\partial s}\left( {-e_2 \,\sigma_1 \,A^{lT}\;\left. {\frac{\partial T}{\partial i}} \right\|_s +A^{lT}\frac{e_1 \,e_2 }{e_3 }\;\left( {\varepsilon +\sigma_1 ^2} \right)\frac{\partial T}{\partial s}} \right)\;\;\;} \right]} \\
	124	%
[11331]	125	\intertext{In other words, the horizontal/vertical Laplacian operator in the ($i$,$s$) plane takes the following form:}
[10414]	126	\end{array}
[11335]	127	} \\
[10414]	128	%
	129	{\frac{1}{e_1\,e_2\,e_3}}
	130	\left( {{
	131	\begin{array}{*{30}c}
	132	{\left. {\frac{\partial \left( {e_2 e_3 \bullet } \right)}{\partial i}} \right\|_s } \hfill \\
	133	{\frac{\partial \left( {e_1 e_2 \bullet } \right)}{\partial s}} \hfill \\
	134	\end{array}}}
	135	\right)
	136	\cdot \left[ {A^{lT}
	137	\left( {{
	138	\begin{array}{*{30}c}
	139	{1} \hfill & {-\sigma_1 } \hfill \\
	140	{-\sigma_1} \hfill & {\varepsilon + \sigma_1^2} \hfill \\
	141	\end{array}
	142	}} \right)
	143	\cdot
	144	\left( {{
	145	\begin{array}{*{30}c}
	146	{\frac{1}{e_1 }\;\left. {\frac{\partial \bullet }{\partial i}} \right\|_s } \hfill \\
	147	{\frac{1}{e_3 }\;\frac{\partial \bullet }{\partial s}} \hfill \\
	148	\end{array}
	149	}} \right) \left( T \right)} \right]
[2282]	150	\end{align*}
[10414]	151	%\addtocounter{equation}{-2}
[707]	152
[11597]	153	%% =================================================================================================
[9393]	154	\section{Iso/Diapycnal $2^{nd}$ order tracer diffusive operators}
[11543]	155	\label{sec:DIFFOPERS_2}
[707]	156
[11597]	157	%% =================================================================================================
[3294]	158	\subsubsection*{In z-coordinates}
[707]	159
[10354]	160	The iso/diapycnal diffusive tensor $\textbf {A}_{\textbf I}$ expressed in
	161	the ($i$,$j$,$k$) curvilinear coordinate system in which
	162	the equations of the ocean circulation model are formulated,
[11123]	163	takes the following form \citep{redi_JPO82}:
[707]	164
[10414]	165	\begin{equation}
[11543]	166	\label{eq:DIFFOPERS_3}
[10414]	167	\textbf {A}_{\textbf I} = \frac{A^{lT}}{\left( {1+a_1 ^2+a_2 ^2} \right)}
	168	\left[ {{
	169	\begin{array}{*{20}c}
[11331]	170	{1+a_2 ^2 +\varepsilon a_1 ^2} \hfill & {-a_1 a_2 (1-\varepsilon)} \hfill & {-a_1 (1-\varepsilon) } \hfill \\
	171	{-a_1 a_2 (1-\varepsilon) } \hfill & {1+a_1 ^2 +\varepsilon a_2 ^2} \hfill & {-a_2 (1-\varepsilon)} \hfill \\
	172	{-a_1 (1-\varepsilon)} \hfill & {-a_2 (1-\varepsilon)} \hfill & {\varepsilon +a_1 ^2+a_2 ^2} \hfill \\
[10414]	173	\end{array}
	174	}} \right]
[3294]	175	\end{equation}
[11351]	176	where ($a_1$, $a_2$) are $(-1) \times$ the isopycnal slopes in
	177	($\textbf{i}$, $\textbf{j}$) directions, relative to geopotentials (or
	178	equivalently the slopes of the geopotential surfaces in the isopycnal
	179	coordinate framework):
[10406]	180	\[
[10414]	181	a_1 =\frac{e_3 }{e_1 }\left( {\frac{\partial \rho }{\partial i}} \right)\left( {\frac{\partial \rho }{\partial k}} \right)^{-1}
	182	\qquad , \qquad
	183	a_2 =\frac{e_3 }{e_2 }\left( {\frac{\partial \rho }{\partial j}}
	184	\right)\left( {\frac{\partial \rho }{\partial k}} \right)^{-1}
[10406]	185	\]
[11331]	186	and, as before, $\epsilon = A^{vT} / A^{lT}$.
[817]	187
[11331]	188	In practice, $\epsilon$ is small and isopycnal slopes are generally less than $10^{-2}$ in the ocean,
[11543]	189	so $\textbf {A}_{\textbf I}$ can be simplified appreciably \citep{cox_OM87}. Keeping leading order terms\footnote{Apart from the (1,0)
[11331]	190	and (0,1) elements which are set to zero. See \citet{griffies_bk04}, section 14.1.4.1 for a discussion of this point.}:
[10414]	191	\begin{subequations}
[11543]	192	\label{eq:DIFFOPERS_4}
[10414]	193	\begin{equation}
[11543]	194	\label{eq:DIFFOPERS_4a}
[10414]	195	{\textbf{A}_{\textbf{I}}} \approx A^{lT}\;\Re\;\text{where} \;\Re =
	196	\left[ {{
	197	\begin{array}{*{20}c}
	198	1 \hfill & 0 \hfill & {-a_1 } \hfill \\
	199	0 \hfill & 1 \hfill & {-a_2 } \hfill \\
	200	{-a_1 } \hfill & {-a_2 } \hfill & {\varepsilon +a_1 ^2+a_2 ^2} \hfill \\
	201	\end{array}
	202	}} \right],
	203	\end{equation}
	204	and the iso/dianeutral diffusive operator in $z$-coordinates is then
	205	\begin{equation}
[11543]	206	\label{eq:DIFFOPERS_4b}
[10414]	207	D^T = \left. \nabla \right\|_z \cdot
	208	\left[ A^{lT} \;\Re \cdot \left. \nabla \right\|_z T \right]. \\
	209	\end{equation}
[3294]	210	\end{subequations}
[817]	211
[11543]	212	Physically, the full tensor \autoref{eq:DIFFOPERS_3} represents strong isoneutral diffusion on a plane parallel to
[10354]	213	the isoneutral surface and weak dianeutral diffusion perpendicular to this plane.
	214	However,
[11543]	215	the approximate `weak-slope' tensor \autoref{eq:DIFFOPERS_4a} represents strong diffusion along the isoneutral surface,
[10354]	216	with weak \emph{vertical} diffusion -- the principal axes of the tensor are no longer orthogonal.
	217	This simplification also decouples the ($i$,$z$) and ($j$,$z$) planes of the tensor.
[11543]	218	The weak-slope operator therefore takes the same form, \autoref{eq:DIFFOPERS_4}, as \autoref{eq:DIFFOPERS_2},
[10354]	219	the diffusion operator for geopotential diffusion written in non-orthogonal $i,j,s$-coordinates.
	220	Written out explicitly,
[3294]	221
[10414]	222	\begin{multline}
[11543]	223	\label{eq:DIFFOPERS_ldfiso}
[10414]	224	D^T=\frac{1}{e_1 e_2 }\left\{
	225	{\;\frac{\partial }{\partial i}\left[ {A_h \left( {\frac{e_2}{e_1}\frac{\partial T}{\partial i}-a_1 \frac{e_2}{e_3}\frac{\partial T}{\partial k}} \right)} \right]}
	226	{+\frac{\partial}{\partial j}\left[ {A_h \left( {\frac{e_1}{e_2}\frac{\partial T}{\partial j}-a_2 \frac{e_1}{e_3}\frac{\partial T}{\partial k}} \right)} \right]\;} \right\} \\
	227	\shoveright{+\frac{1}{e_3 }\frac{\partial }{\partial k}\left[ {A_h \left( {-\frac{a_1 }{e_1 }\frac{\partial T}{\partial i}-\frac{a_2 }{e_2 }\frac{\partial T}{\partial j}+\frac{\left( {a_1 ^2+a_2 ^2+\varepsilon} \right)}{e_3 }\frac{\partial T}{\partial k}} \right)} \right]}. \\
[3294]	228	\end{multline}
	229
[11543]	230	The isopycnal diffusion operator \autoref{eq:DIFFOPERS_4},
	231	\autoref{eq:DIFFOPERS_ldfiso} conserves tracer quantity and dissipates its square.
	232	As \autoref{eq:DIFFOPERS_4} is the divergence of a flux, the demonstration of the first property is trivial, providing that the flux normal to the boundary is zero
[11335]	233	(as it is when $A_h$ is zero at the boundary). Let us demonstrate the second one:
[10406]	234	\[
[10414]	235	\iiint\limits_D T\;\nabla .\left( {\textbf{A}}_{\textbf{I}} \nabla T \right)\,dv
	236	= -\iiint\limits_D \nabla T\;.\left( {\textbf{A}}_{\textbf{I}} \nabla T \right)\,dv,
[10406]	237	\]
[3294]	238	and since
[10414]	239	\begin{align*}
	240	{
	241	\begin{array}{*{20}l}
[11151]	242	\nabla T\;.\left( {{\mathrm {\mathbf A}}_{\mathrm {\mathbf I}} \nabla T}
[10414]	243	\right)&=A^{lT}\left[ {\left( {\frac{\partial T}{\partial i}} \right)^2-2a_1
	244	\frac{\partial T}{\partial i}\frac{\partial T}{\partial k}+\left(
	245	{\frac{\partial T}{\partial j}} \right)^2} \right. \\
	246	&\qquad \qquad \qquad
	247	{ \left. -\,{2a_2 \frac{\partial T}{\partial j}\frac{\partial T}{\partial k}+\left( {a_1 ^2+a_2 ^2+\varepsilon} \right)\left( {\frac{\partial T}{\partial k}} \right)^2} \right]} \\
	248	&=A_h \left[ {\left( {\frac{\partial T}{\partial i}-a_1 \frac{\partial
	249	T}{\partial k}} \right)^2+\left( {\frac{\partial T}{\partial
	250	j}-a_2 \frac{\partial T}{\partial k}} \right)^2}
	251	+\varepsilon \left(\frac{\partial T}{\partial k}\right) ^2\right] \\
[11543]	252	& \geq 0 .
[10414]	253	\end{array}
	254	}
[817]	255	\end{align*}
[10414]	256	%\addtocounter{equation}{-1}
[10354]	257	the property becomes obvious.
[707]	258
[11597]	259	%% =================================================================================================
[3294]	260	\subsubsection*{In generalized vertical coordinates}
[707]	261
[11543]	262	Because the weak-slope operator \autoref{eq:DIFFOPERS_4},
	263	\autoref{eq:DIFFOPERS_ldfiso} is decoupled in the ($i$,$z$) and ($j$,$z$) planes,
[10354]	264	it may be transformed into generalized $s$-coordinates in the same way as
[11543]	265	\autoref{sec:DIFFOPERS_1} was transformed into \autoref{sec:DIFFOPERS_2}.
[10354]	266	The resulting operator then takes the simple form
[707]	267
[10414]	268	\begin{equation}
[11543]	269	\label{eq:DIFFOPERS_ldfiso_s}
[10414]	270	D^T = \left. \nabla \right\|_s \cdot
	271	\left[ A^{lT} \;\Re \cdot \left. \nabla \right\|_s T \right] \\
	272	\;\;\text{where} \;\Re =\left( {{
	273	\begin{array}{*{20}c}
	274	1 \hfill & 0 \hfill & {-r _1 } \hfill \\
	275	0 \hfill & 1 \hfill & {-r _2 } \hfill \\
	276	{-r _1 } \hfill & {-r _2 } \hfill & {\varepsilon +r _1
	277	^2+r _2 ^2} \hfill \\
	278	\end{array}
	279	}} \right),
[3294]	280	\end{equation}
	281
[11351]	282	where ($r_1$, $r_2$) are $(-1)\times$ the isopycnal slopes in ($\textbf{i}$, $\textbf{j}$) directions,
	283	relative to $s$-coordinate surfaces (or equivalently the slopes of the
	284	$s$-coordinate surfaces in the isopycnal coordinate framework):
[10406]	285	\[
[10414]	286	r_1 =\frac{e_3 }{e_1 }\left( {\frac{\partial \rho }{\partial i}} \right)\left( {\frac{\partial \rho }{\partial s}} \right)^{-1}
	287	\qquad , \qquad
	288	r_2 =\frac{e_3 }{e_2 }\left( {\frac{\partial \rho }{\partial j}}
	289	\right)\left( {\frac{\partial \rho }{\partial s}} \right)^{-1}.
[10406]	290	\]
[3294]	291
[11543]	292	To prove \autoref{eq:DIFFOPERS_ldfiso_s} by direct re-expression of \autoref{eq:DIFFOPERS_ldfiso} is straightforward, but laborious.
	293	An easier way is first to note (by reversing the derivation of \autoref{sec:DIFFOPERS_2} from \autoref{sec:DIFFOPERS_1} ) that
[10354]	294	the weak-slope operator may be \emph{exactly} reexpressed in non-orthogonal $i,j,\rho$-coordinates as
[3294]	295
[10414]	296	\begin{equation}
[11543]	297	\label{eq:DIFFOPERS_5}
[10414]	298	D^T = \left. \nabla \right\|_\rho \cdot
	299	\left[ A^{lT} \;\Re \cdot \left. \nabla \right\|_\rho T \right] \\
	300	\;\;\text{where} \;\Re =\left( {{
	301	\begin{array}{*{20}c}
	302	1 \hfill & 0 \hfill &0 \hfill \\
	303	0 \hfill & 1 \hfill & 0 \hfill \\
	304	0 \hfill & 0 \hfill & \varepsilon \hfill \\
	305	\end{array}
	306	}} \right).
[3294]	307	\end{equation}
[10354]	308	Then direct transformation from $i,j,\rho$-coordinates to $i,j,s$-coordinates gives
[11543]	309	\autoref{eq:DIFFOPERS_ldfiso_s} immediately.
[3294]	310
[10354]	311	Note that the weak-slope approximation is only made in transforming from
	312	the (rotated,orthogonal) isoneutral axes to the non-orthogonal $i,j,\rho$-coordinates.
	313	The further transformation into $i,j,s$-coordinates is exact, whatever the steepness of the $s$-surfaces,
[11331]	314	in the same way as the transformation of horizontal/vertical Laplacian diffusion in $z$-coordinates in
[11543]	315	\autoref{sec:DIFFOPERS_1} onto $s$-coordinates is exact, however steep the $s$-surfaces.
[3294]	316
[11597]	317	%% =================================================================================================
[9393]	318	\section{Lateral/Vertical momentum diffusive operators}
[11543]	319	\label{sec:DIFFOPERS_3}
[707]	320
[11331]	321	The second order momentum diffusion operator (Laplacian) in $z$-coordinates is found by
[11543]	322	applying \autoref{eq:MB_lap_vector}, the expression for the Laplacian of a vector,
[10354]	323	to the horizontal velocity vector:
[817]	324	\begin{align*}
[10414]	325	\Delta {\textbf{U}}_h
	326	&=\nabla \left( {\nabla \cdot {\textbf{U}}_h } \right)-
	327	\nabla \times \left( {\nabla \times {\textbf{U}}_h } \right) \\ \\
	328	&=\left( {{
	329	\begin{array}{*{20}c}
	330	{\frac{1}{e_1 }\frac{\partial \chi }{\partial i}} \hfill \\
	331	{\frac{1}{e_2 }\frac{\partial \chi }{\partial j}} \hfill \\
	332	{\frac{1}{e_3 }\frac{\partial \chi }{\partial k}} \hfill \\
	333	\end{array}
	334	}} \right)
	335	-\left( {{
	336	\begin{array}{*{20}c}
	337	{\frac{1}{e_2 }\frac{\partial \zeta }{\partial j}-\frac{1}{e_3
	338	}\frac{\partial }{\partial k}\left( {\frac{1}{e_3 }\frac{\partial
	339	u}{\partial k}} \right)} \hfill \\
	340	{\frac{1}{e_3 }\frac{\partial }{\partial k}\left( {-\frac{1}{e_3
	341	}\frac{\partial v}{\partial k}} \right)-\frac{1}{e_1 }\frac{\partial \zeta
	342	}{\partial i}} \hfill \\
	343	{\frac{1}{e_1 e_2 }\left[ {\frac{\partial }{\partial i}\left( {\frac{e_2
	344	}{e_3 }\frac{\partial u}{\partial k}} \right)-\frac{\partial }{\partial
	345	j}\left( {-\frac{e_1 }{e_3 }\frac{\partial v}{\partial k}} \right)} \right]}
	346	\hfill \\
	347	\end{array}
	348	}} \right) \\ \\
	349	&=\left( {{
	350	\begin{array}{*{20}c}
	351	{\frac{1}{e_1 }\frac{\partial \chi }{\partial i}-\frac{1}{e_2 }\frac{\partial \zeta }{\partial j}} \\
	352	{\frac{1}{e_2 }\frac{\partial \chi }{\partial j}+\frac{1}{e_1 }\frac{\partial \zeta }{\partial i}} \\
	353	0 \\
	354	\end{array}
	355	}} \right)
	356	+\frac{1}{e_3 }
	357	\left( {{
	358	\begin{array}{*{20}c}
	359	{\frac{\partial }{\partial k}\left( {\frac{1}{e_3 }\frac{\partial u}{\partial k}} \right)} \\
	360	{\frac{\partial }{\partial k}\left( {\frac{1}{e_3 }\frac{\partial v}{\partial k}} \right)} \\
	361	{\frac{\partial \chi }{\partial k}-\frac{1}{e_1 e_2 }\left( {\frac{\partial ^2\left( {e_2 \,u} \right)}{\partial i\partial k}+\frac{\partial ^2\left( {e_1 \,v} \right)}{\partial j\partial k}} \right)} \\
	362	\end{array}
	363	}} \right)
[817]	364	\end{align*}
[11543]	365	Using \autoref{eq:MB_div}, the definition of the horizontal divergence,
[11331]	366	the third component of the second vector is obviously zero and thus :
[10406]	367	\[
[11543]	368	\Delta {\textbf{U}}_h = \nabla _h \left( \chi \right) - \nabla _h \times \left( \zeta \textbf{k} \right) + \frac {1}{e_3 } \frac {\partial }{\partial k} \left( {\frac {1}{e_3 } \frac{\partial {\textbf{ U}}_h }{\partial k}} \right) .
[10406]	369	\]
[707]	370
[10354]	371	Note that this operator ensures a full separation between
[11543]	372	the vorticity and horizontal divergence fields (see \autoref{apdx:INVARIANTS}).
[10354]	373	It is only equal to a Laplacian applied to each component in Cartesian coordinates, not on the sphere.
[707]	374
[10354]	375	The horizontal/vertical second order (Laplacian type) operator used to diffuse horizontal momentum in
	376	the $z$-coordinate therefore takes the following form:
[10414]	377	\begin{equation}
[11543]	378	\label{eq:DIFFOPERS_Lap_U}
[10414]	379	{
	380	\textbf{D}}^{\textbf{U}} =
	381	\nabla _h \left( {A^{lm}\;\chi } \right)
	382	- \nabla _h \times \left( {A^{lm}\;\zeta \;{\textbf{k}}} \right)
	383	+ \frac{1}{e_3 }\frac{\partial }{\partial k}\left( {\frac{A^{vm}\;}{e_3 }
[11335]	384	\frac{\partial {\mathrm {\mathbf U}}_h }{\partial k}} \right) , \\
[817]	385	\end{equation}
[1223]	386	that is, in expanded form:
[817]	387	\begin{align*}
[10414]	388	D^{\textbf{U}}_u
	389	& = \frac{1}{e_1} \frac{\partial \left( {A^{lm}\chi } \right)}{\partial i}
	390	-\frac{1}{e_2} \frac{\partial \left( {A^{lm}\zeta } \right)}{\partial j}
[11335]	391	+\frac{1}{e_3} \frac{\partial }{\partial k} \left( \frac{A^{vm}}{e_3} \frac{\partial u}{\partial k} \right) , \\
[10414]	392	D^{\textbf{U}}_v
	393	& = \frac{1}{e_2 }\frac{\partial \left( {A^{lm}\chi } \right)}{\partial j}
	394	+\frac{1}{e_1 }\frac{\partial \left( {A^{lm}\zeta } \right)}{\partial i}
[11335]	395	+\frac{1}{e_3} \frac{\partial }{\partial k} \left( \frac{A^{vm}}{e_3} \frac{\partial v}{\partial k} \right) .
[817]	396	\end{align*}
[707]	397
[11543]	398	Note Bene: introducing a rotation in \autoref{eq:DIFFOPERS_Lap_U} does not lead to
[10354]	399	a useful expression for the iso/diapycnal Laplacian operator in the $z$-coordinate.
	400	Similarly, we did not found an expression of practical use for
	401	the geopotential horizontal/vertical Laplacian operator in the $s$-coordinate.
[11543]	402	Generally, \autoref{eq:DIFFOPERS_Lap_U} is used in both $z$- and $s$-coordinate systems,
[10354]	403	that is a Laplacian diffusion is applied on momentum along the coordinate directions.
[10414]	404
[11584]	405	\onlyinsubfile{\input{../../global/epilogue}}
[10414]	406
[6997]	407	\end{document}

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