1.6.1 Coordinate systems

About

Installation

Tutorials

Documentation

1.1 Introduction

1.3 Continuous equations in `r' coordinates

2. Discretization and Algorithm

4. Software Architecture

5. Automatic Differentiation

6. Physical Parameterization and Packages

7. Diagnostics and tools

8. Interface with ECCO

Browse Code

PDF file (9Mb)

PS file (7Mb)

Next: 2. Discretization and Algorithm Up: 1.6 Appendix:OPERATORS Previous: 1.6 Appendix:OPERATORS Contents

Subsections

1.6.1.1 Spherical coordinates

1.6.1 Coordinate systems

1.6.1.1 Spherical coordinates

In spherical coordinates, the velocity components in the zonal, meridional and vertical direction respectively, are given by (see Fig.2) :

$\displaystyle u=r\cos \varphi \frac{D\lambda }{Dt}$

$\displaystyle v=r\frac{D\varphi }{Dt}$

$\displaystyle \dot{r}=\frac{Dr}{Dt}$

Here $\varphi$ is the latitude, $\lambda$ the longitude, the radial distance of the particle from the center of the earth, $\Omega$ is the angular speed of rotation of the Earth and is the total derivative.

The `grad' ( $\nabla$ ) and `div' ( $\nabla\cdot$ ) operators are defined by, in spherical coordinates:

$\displaystyle \nabla \equiv \left( \frac{1}{r\cos \varphi }\frac{\partial }{\pa... ...c{1}{r}\frac{\partial }{\partial \varphi },\frac{\partial }{\partial r} \right)$

$\displaystyle \nabla\cdot v\equiv \frac{1}{r\cos \varphi }\left\{ \frac{\partia... ...right\} +\frac{1}{r^{2}}\frac{\partial \left( r^{2}\dot{r}\right) }{\partial r}$

Next: 2. Discretization and Algorithm Up: 1.6 Appendix:OPERATORS Previous: 1.6 Appendix:OPERATORS Contents

mitgcm-support@mitgcm.org

Last update 2018-01-23