# How to solve an integral equation in python?

I'm trying to solve this integral equation using Python:

where z ranges from 0 to 1.

The scipy.quad function only provides the numerical solution for a certain interval, but it doesn't provide the solution over the interval.

``````def f(z,Om,Ol): return 1./p.sqrt((1+z)**2 * (1+Om*z) - z*(2+z)*Ol)
(0.77142706642781111, 8.5645609096719596e-15)
``````

But I don't know how to get a full vector in this interval, as you get when using scipy.odeint to solve a differential equation.

In the other hand, sympy.integrate can't do it. I get a stack overflow. Plus, I can't figure out how to substitute the symbols by a list,i.e.:

``````sy.integrate(x**2,x).subs(x,1)
1/3
sy.integrate(x**2,x).subs(x,[1,2])
TypeError: unhashable type: 'list'
``````

So the question is: does anyone know how to solve an integral equation using python?

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– kingpin Aug 23 '11 at 12:23
welcome to stack overflow – Profane Aug 23 '11 at 12:35
as you talk about an integral equation: What is the value you are looking for ? Do you want to get z1 for a given D_L ? – rocksportrocker Aug 23 '11 at 12:52
You have a z before the integral, is this an typo ? – rocksportrocker Aug 23 '11 at 12:52
I can't figure out how to use linalg to solve an integral equation. – Illa Rivero Losada Aug 26 '11 at 12:24

I understand that you want to solve a differential equation `dF/dz1 = f(z1, Om, Ol)` and want `F(z1)` at different locations. If this is the case, then the Ordinary Differential Equation (ODE) routines of SciPy are the way to go. You might want to check `odeint()`, in particular, as it can give you the values of your integral at locations that you specify.

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Thank you for your help, but I'm not trying to solve a differential equation, but to solve a integral equation. I've used odeint() routine in other cases and it works fine for me, but it's useful only for differential equations, I can't use it in this case. – Illa Rivero Losada Aug 26 '11 at 12:23
@Illa Rivero Losada: Thanks. Are you trying to have Python find an analytical formula for the integral? "Solving an integral equation" in fact has a very specific meaning (en.wikipedia.org/wiki/Integral_equation), which does not appear to apply to your question. If you are indeed looking for an analytical solution, a good place to ask this question would be mathoverflow. The case ΩM = 0 is doable (en.wikipedia.org/wiki/List_of_integrals_of_irrational_functions), but I'm not sure about the general case… – EOL Aug 29 '11 at 15:41

I suppose that the z before the integral is a typo which should be z1, and you are looking for z1 given DL.

First you have to implement the right hand side (rhs):

``````def f(z,Om,Ol):
return 1./p.sqrt((1+z)**2 * (1+Om*z) - z*(2+z)*Ol)
def rhs(z1, Om, Ol, c, H0):
return c/H0*(1+z1)*quad(lambda r:f(r, Om, Ol), 0, z1)[0]
``````

Now you have to find a z0 such that rhs(z1, ...) = DL, which is the same as

``````rhs(z1, ...) - DL = 0
``````

Which means that your problem is reduced to finding the zero (there is only one, because rhs is monotone in), of

``````f(z1) = rhs(z1, ...) - DL
``````

Here you can apply many methods for root finding (see http://en.wikipedia.org/wiki/Root-finding_algorithm) from http://docs.scipy.org/doc/scipy/reference/optimize.html#root-finding

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In the sympy examples section at, http://docs.sympy.org/0.7.1/modules/integrals.html, they show solutions to nearly identical problems. Can you post your sympy code?

For scipy, did you try using a tuple, which is hashable, instead of a list? e.g.:

``````sy.integrate(x**2,x).subs(x,(1,2,))
``````
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I've tried, but I got an error: TypeError: unsupported operand type(s) for ** or pow(): 'tuple' and 'Integer' – Illa Rivero Losada Aug 26 '11 at 12:26

I finally used the "quad" function with a for statement to solve my problem:

``````import pylab as p
import scipy as s

def Dl_lflrw(z,Om,Ol):
c = 1.
H0 = 1.
y = []
for i in z: