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

enter image description here

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)
quad(lambda r:f(r,Om,Ol),0,1)
(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.:

TypeError: unhashable type: 'list'

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

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Use numpy:… – 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 (, 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 (, 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 from

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In the sympy examples section at,, 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.:

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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
from scipy.integrate import odeint,quad

def Dl_lflrw(z,Om,Ol):
    c = 1.
    H0 = 1.
    y = []
    for i in z:
        y1 = (c/H0)*(1+i)*quad(lambda r:f(r,Om,Ol),0,i)[0]
    return p.asarray(y)

def f(z,Om,Ol):
    return 1./p.sqrt((1+z)**2 * (1+Om*z) - z*(2+z)*Ol)

Thank you all for your ideas, they was really helpful.

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