Minor edits.
--- a/odes.org Mon Apr 19 13:05:18 2010 +0530
+++ b/odes.org Mon Apr 19 14:59:29 2010 +0530
@@ -7,29 +7,30 @@
********* working knowledge of arrays
********* working knowledge of functions
*** Script
- Welcome.
+ Welcome friends.
- In this tutorial we shall look at solving Ordinary Differential Equations
- using odeints in Python.
+ In this tutorial we shall look at solving Ordinary Differential Equations,
+ ODE henceforth using odeint in Python.
- Let's consider a classical problem of the spread of epidemic in a
+ Let's consider the classic problem of the spread of an epidemic in a
population.
- This is given by dy/dt = ky(L-y) where L is the total population.
- For our problem Let us use L=25000, k=0.00003.
+ This is given by the ordinary differential equation dy/dt = ky(L-y)
+ where L is the total population and k is an arbitrary constant. For our
+ problem Let us use L=25000, k=0.00003.
Let the boundary condition be y(0)=250.
- Lets start ipython -pylab interpreter.
+ Lets fire up IPython by typing ipython -pylab interpreter.
- As we saw in one of earlier session, sometime pylab wont 'import' all
+ As we saw in one of earlier session, sometimes pylab wont 'import' all
packages. For solving 'ordinary differential equations' also we shall
- import 'odeint' function which is part SciPy package. So we run the
- magic command:
+ have to import 'odeint' function which is a part of the SciPy package.
+ So we run the magic command:
In []: from scipy.integrate import odeint
- # For now just remember this as a command that does some magic to obtain
- # the function odeint in to our program.
- We will cover more details regarding 'import' in subsequent sessions.
+ For now just remember this as a command that does some magic to obtain
+ the function odeint in to our program.
+ The details regarding `import' shall be covered in a subsequent tutorial.
We can represent the given ODE as a Python function.
This function takes the dependent variable y and the independent variable t
@@ -37,26 +38,27 @@
Our function looks like this:
(Showing the slide should be sufficient)
+ Let us now define our function.
+
In []: def epid(y, t):
.... k = 0.00003
.... L = 25000
.... return k*y*(L-y)
-
- Independent variable t can have be assigned the values in the interval of
+ Independent variable t can be assigned the values in the interval of
0 and 12 with 61 points using linspace:
In []: t = linspace(0, 12, 61)
- Now obtaining the odeint of the ode we have already defined is as simple as
- calling the Python's odeint function which we imported:
+ Now obtaining the solution of the ode we defined, is as simple as
+ calling the Python's odeint function which we just imported:
In []: y = odeint(epid, 250, t)
We can plot the the values of y against t to get a graphical picture our ODE.
plot(y, t)
- Lets close this plot and move on to solving ordinary differential equation of
+ Lets now close this plot and move on to solving ordinary differential equation of
second order.
Here we shall take the example ODEs of a simple pendulum.
@@ -91,9 +93,9 @@
dependent variables in the system, theta and omega.
The second argument is the independent variable t.
- In the function we assign theta and omega to first and second values of the
- initial argument respectively.
- Acceleration due to gravity, as we know is 9.8 meter per second sqaure.
+ In the function we assign the first and second values of the
+ initial argument to theta and omega respectively.
+ Acceleration due to gravity, as we know is 9.81 meter per second sqaure.
Let the length of the the pendulum be 0.2 meter.
We create a list, f, of two equations which corresponds to our two ODEs,
@@ -119,7 +121,7 @@
Plotting theta against t and omega against t we obtain the plots as shown
in the slide.
- Thus we come to the end of this session on solving ordinary differential
- equations in Python. Thanks for listening to this tutorial.
+ Thus we come to the end of this tutorial on solving ordinary differential
+ equations in Python. In this tutorial we have learnt,
*** Notes
--- a/presentations/ode.tex Mon Apr 19 13:05:18 2010 +0530
+++ b/presentations/ode.tex Mon Apr 19 14:59:29 2010 +0530
@@ -56,7 +56,7 @@
\newcommand{\kwrd}[1]{ \texttt{\textbf{\color{blue}{#1}}} }
% Title page
-\title{Python for Scientific Computing :Ordinary Differential Equation}
+\title{Python for Scientific Computing: Ordinary Differential Equation}
\author[FOSSEE] {FOSSEE}
@@ -87,8 +87,8 @@
\begin{frame}[fragile]
\frametitle{Summary}
\begin{block}{}
- \item Solving ordinary differential equations
- \end{block}
+ Solving ordinary differential equations
+ \end{block}
\end{frame}
\begin{frame}