Difference between revisions of "Useful Examples"

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link to the one on the trac which is what is on svn and thus will always be up to date:
 
link to the one on the trac which is what is on svn and thus will always be up to date:
 
https://trac.lmd.jussieu.fr/Planeto/browser/trunk/LMDZ.GENERIC/ManualGCM_GENERIC.pdf
 
https://trac.lmd.jussieu.fr/Planeto/browser/trunk/LMDZ.GENERIC/ManualGCM_GENERIC.pdf
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[[Category:FAQ]]

Revision as of 17:14, 20 March 2023

Editing convention

  • Name of the files: italic

To Edit Sidebar (as admin only!!!)

Go to MediaWiki:Sidebar

To write some LateX

See e.g. LMDZPedia And check out this page in "edit" mode! $$\newcommand{\Re}{\mathrm{Re}\,} \newcommand{\pFq}[5]{{}_{#1}\mathrm{F}_{#2} \left( \genfrac{}{}{0pt}{}{#3}{#4} \bigg| {#5} \right)}$$

We consider, for various values of $$s$$, the $$n$$-dimensional integral \begin{align} \label{def:Wns} W_n (s) &:= \int_{[0, 1]^n} \left| \sum_{k = 1}^n \mathrm{e}^{2 \pi \mathrm{i} \, x_k} \right|^s \mathrm{d}\boldsymbol{x} \end{align} which occurs in the theory of uniform random walk integrals in the plane, where at each step a unit-step is taken in a random direction. As such, the integral \eqref{def:Wns} expresses the $$s$$-th moment of the distance to the origin after $$n$$ steps.

By experimentation and some sketchy arguments we quickly conjectured and strongly believed that, for $$k$$ a nonnegative integer \begin{align} \label{eq:W3k} W_3(k) &= \Re \, \pFq32{\frac12, -\frac k2, -\frac k2}{1, 1}{4}. \end{align}

Appropriately defined, \eqref{eq:W3k} also holds for negative odd integers. The reason for \eqref{eq:W3k} was long a mystery, but it will be explained at the end of the paper.

Miscellaneous

  • HTML like syntax works! e.g. comments with
 <!-- This is a comment in the page -->
 which you see because between "pre" tags
  • Some special features:

Link to the internal page with all special features: Special:Version

  • Examples of Syntax Highlighting:

Some Fortran Code:

1 program truc
2 implicit none
3 integer :: i
4 do i=1,10
5   write(*,*) "i=",i," for each hello planeto world"
6 end do
7 end program

Some Python Code:

1 import numpy
2 import matplotlib as plt
3 for i in range(0,5,1):
4  print('hello planeto world")
5 plt.show()

Some bash code:

1 echo 'hello planeto world'

How to create a new page

Option 1: Make a link to that page from a currently existing page, and when you click on that link (will be displayed in red as the system notices that it is a broken link) and the system will ask you if you want to create the page. A reminder on how to add (code-wise) a link to another MediaWiki page (try to follow CamelCase formatting, see option 2 below):

[[Link_To_Some_Page|some descriptive text]]

which will be rendered as: some descriptive text

Option 2: Look for it via the search bar! Advice: you should use CamelCase formating (with a "_" between words) as this page name will end up also being the title of the page (with the "_" replaced by spaces), e.g. The_Best_Page_Ever

Link to the Generic PCM user manual

link to the one on the trac which is what is on svn and thus will always be up to date: https://trac.lmd.jussieu.fr/Planeto/browser/trunk/LMDZ.GENERIC/ManualGCM_GENERIC.pdf