Difference between revisions of "Terrain-Following Coordinate Transformation"

From the point of view of the computational model, it is highly convenient to introduce a stretched vertical coordinate system which essentially "flattens out" the variable bottom at ${\displaystyle z=-h(x,y)}$. Such "${\displaystyle \sigma }$" coordinate systems have long been used, with slight appropriate modification, in both meteorology and oceanography [e.g., Phillips (1957) and Freeman et al. (1972)]. To proceed, we make the coordinate transformation:

$${\displaystyle {\begin{aligned}{\hat {x}}&=x\\{\hat {y}}&=y\\\sigma &=\sigma (x,y,z)\\z&=z(x,y,\sigma )\\{\hat {t}}&=t\end{aligned}}}$$

(1)

See Vertical S-coordinate for the form of ${\displaystyle \sigma }$ used here. Also, see Shchepetkin and McWilliams, 2005 for a discussion about the nature of this form of ${\displaystyle \sigma }$ and how it differs from that used in SCRUM.

In the stretched system, the vertical coordinate ${\displaystyle \sigma }$ spans the range ${\displaystyle -1\leq \sigma \leq 0}$; we are therefore left with level upper (${\displaystyle \sigma =0}$) and lower (${\displaystyle \sigma =-1}$) bounding surfaces. The chain rules for this transformation are:

$${\displaystyle {\begin{aligned}\left({\partial \over \partial x}\right)_{z}&=\left({\partial \over \partial x}\right)_{\sigma }-\left({1 \over H_{z}}\right)\left({\partial z \over \partial x}\right)_{\sigma }{\partial \over \partial \sigma }\\\\\left({\partial \over \partial y}\right)_{z}&=\left({\partial \over \partial y}\right)_{\sigma }-\left({1 \over H_{z}}\right)\left({\partial z \over \partial y}\right)_{\sigma }{\partial \over \partial \sigma }\\\\{\partial \over \partial z}&=\left({\partial \sigma \over \partial z}\right){\partial \over \partial \sigma }={1 \over H_{z}}{\partial \over \partial \sigma }\end{aligned}}}$$

(2)

where

$${\displaystyle H_{z}\equiv {\partial z \over \partial \sigma }}$$

(3)

As a trade-off for this geometric simplification, the dynamic equations become somewhat more complicated. The resulting dynamic equations, after dropping the carats, are:

$${\displaystyle {\partial u \over \partial t}-fv+{\vec {v}}\cdot \nabla u=-{\partial \phi \over \partial x}-\left({\frac {g\rho }{\rho _{o}}}\right){\frac {\partial z}{\partial x}}-g{\partial \zeta \over \partial x}+{1 \over H_{z}}{\partial \over \partial \sigma }\left[{(K_{m}+\nu ) \over H_{z}}{\partial u \over \partial \sigma }\right]+{\cal {F}}_{u}+{\cal {D}}_{u}}$$

(4)

$${\displaystyle {\frac {\partial v}{\partial t}}+fu+{\vec {v}}\cdot \nabla v=-{\frac {\partial \phi }{\partial y}}-\left({\frac {g\rho }{\rho _{o}}}\right){\frac {\partial z}{\partial y}}-g{\partial \zeta \over \partial y}+{1 \over H_{z}}{\partial \over \partial \sigma }\left[{(K_{m}+\nu ) \over H_{z}}{\partial v \over \partial \sigma }\right]+{\cal {F}}_{v}+{\cal {D}}_{v}}$$

(5)

$${\displaystyle {\frac {\partial C}{\partial t}}+{\vec {v}}\cdot \nabla C={1 \over H_{z}}{\partial \over \partial \sigma }\left[{(K_{C}+\nu ) \over H_{z}}{\partial C \over \partial \sigma }\right]+{\cal {F}}_{C}+{\cal {D}}_{C}}$$

(6)

$${\displaystyle \rho =\rho (T,S,P)}$$

(7)

$${\displaystyle {\frac {\partial \phi }{\partial \sigma }}=\left({\frac {-gH_{z}\rho }{\rho _{o}}}\right)}$$

(8)

$${\displaystyle {\partial H_{z} \over \partial t}+{\partial (H_{z}u) \over \partial x}+{\partial (H_{z}v) \over \partial y}+{\partial (H_{z}\Omega ) \over \partial \sigma }=0}$$

(9)

where

$${\displaystyle {\vec {v}}=(u,v,\Omega )}$$

(10)

$${\displaystyle {\vec {v}}\cdot \nabla =u{\frac {\partial }{\partial x}}+v{\frac {\partial }{\partial y}}+\Omega {\frac {\partial }{\partial \sigma }}}$$

(11)

The vertical velocity in ${\displaystyle \sigma }$ coordinates is

$${\displaystyle \Omega (x,y,\sigma ,t)={1 \over H_{z}}\left[w-{z+h \over \zeta +h}{\partial \zeta \over \partial t}-u{\partial z \over \partial x}-v{\partial z \over \partial y}\right]}$$

(12)

and

$${\displaystyle w={\partial z \over \partial t}+u{\partial z \over \partial x}+v{\partial z \over \partial y}+\Omega H_{z}}$$

(13)

Vertical Boundary Conditions

In the stretched coordinate system, the vertical boundary conditions become:

top (${\displaystyle \sigma =0}$):

$${\displaystyle {\begin{aligned}\left({\frac {K_{m}}{H_{z}}}\right){\frac {\partial u}{\partial \sigma }}&=\tau _{s}^{x}(x,y,t)\\\left({\frac {K_{m}}{H_{z}}}\right){\frac {\partial v}{\partial \sigma }}&=\tau _{s}^{y}(x,y,t)\\\left({\frac {K_{C}}{H_{z}}}\right){\frac {\partial C}{\partial \sigma }}&={Q_{C} \over \rho _{o}c_{P}}\\\Omega &=0\end{aligned}}}$$

(14)

and bottom (${\displaystyle \sigma =-1}$):

$${\displaystyle {\begin{aligned}\left({\frac {K_{m}}{H_{z}}}\right){\frac {\partial u}{\partial \sigma }}&=\tau _{b}^{x}(x,y,t)\\\left({\frac {K_{m}}{H_{z}}}\right){\frac {\partial v}{\partial \sigma }}&=\tau _{b}^{y}(x,y,t)\\\left({\frac {K_{C}}{H_{z}}}\right){\frac {\partial C}{\partial \sigma }}&=0\\\Omega &=0\end{aligned}}}$$

(15)

Note the simplification of the boundary conditions on vertical velocity that arises from the ${\displaystyle \sigma }$ coordinate transformation.