# How to force zero interception in linear regression?

I'm a bit of a newby so apologies if this question has already been answered, I've had a look and couldn't find specifically what I was looking for.

I have some more or less linear data of the form

``````x = [0.1, 0.2, 0.4, 0.6, 0.8, 1.0, 2.0, 4.0, 6.0, 8.0, 10.0, 20.0, 40.0, 60.0, 80.0]
y = [0.50505332505407008, 1.1207373784533172, 2.1981844719020001, 3.1746209003398689, 4.2905482471260044, 6.2816226678076958, 11.073788414382639, 23.248479770546009, 32.120462301367183, 44.036117671229206, 54.009003143831116, 102.7077685684846, 185.72880217806673, 256.12183145545811, 301.97120103079675]
``````

I am using `scipy.optimize.leastsq` to fit a linear regression to this:

``````def lin_fit(x, y):
'''Fits a linear fit of the form mx+b to the data'''
fitfunc = lambda params, x: params[0] * x + params[1]    #create fitting function of form mx+b
errfunc = lambda p, x, y: fitfunc(p, x) - y              #create error function for least squares fit

init_a = 0.5                            #find initial value for a (gradient)
init_b = min(y)                         #find initial value for b (y axis intersection)
init_p = numpy.array((init_a, init_b))  #bundle initial values in initial parameters

#calculate best fitting parameters (i.e. m and b) using the error function
p1, success = scipy.optimize.leastsq(errfunc, init_p.copy(), args = (x, y))
f = fitfunc(p1, x)          #create a fit with those parameters
return p1, f
``````

And it works beautifully (although I am not sure if scipy.optimize is the right thing to use here, it might be a bit over the top?).

However, due to the way the data points lie it does not give me a y-axis interception at 0. I do know though that it has to be zero in this case, `if x = 0 than y = 0`.

Is there any way I can force this?

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If you know your intercept is 0, why do you have it as a free parameter in your function to fit? Could you just remove `b` as a free parameter? –  Jdog Apr 3 '12 at 9:51
Ah. yes. Of course! I apologise, this is a really obvious answer. Sometimes I do not see the wood for the trees :-/ This works fine. Thank you very much for pointing it out to me! –  Kyra Tafar Apr 3 '12 at 10:51
I just see the plot of the data in an answer. Unrelated with the question, you should try a second order polynomial to fit. Usually one can say that the intercept is null if is in the order of its error, and I think that in a parabola fit you will get it. –  chuse Feb 14 at 15:11

I am not adept at these modules, but I have some experience in statistics, so here is what I see. You need to change your fit function from

``````fitfunc = lambda params, x: params[0] * x + params[1]
``````

to:

``````fitfunc = lambda params, x: params[0] * x
``````

Also remove the line:

``````init_b = min(y)
``````

And change the next line to:

``````init_p = numpy.array((init_a))
``````

This should get rid of the second parameter that is producing the y-intercept and pass the fitted line through the origin. There might be a couple more minor alterations you might have to do for this in the rest of your code.

But yes, I'm not sure if this module will work if you just pluck the second parameter away like this. It depends on the internal workings of the module as to whether it can accept this modification. For example, I don't know where `params`, the list of parameters, is being initialized, so I don't know if doing just this will change its length.

And as an aside, since you mentioned, this I actually think is a bit of an over-the-top way to optimize just a slope. You could read up linear regression a little and write small code to do it yourself after some back-of-the envelope calculus. It's pretty simple and straightforward, really. In fact, I just did some calculations, and I guess the optimized slope will just be `<xy>/<x^2>`, i.e. the mean of x*y products divided by the mean of x^2's.

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Thank you, this is exactly what I need to do. :) –  Kyra Tafar Apr 3 '12 at 10:52

As @AbhranilDas mentioned, just use a linear method. There's no need for a non-linear solver like `scipy.optimize.lstsq`.

Typically, you'd use `numpy.polyfit` to fit a line to your data, but in this case you'll need to do use `numpy.linalg.lstsq` directly, as you want to set the intercept to zero.

As a quick example:

``````import numpy as np
import matplotlib.pyplot as plt

x = np.array([0.1, 0.2, 0.4, 0.6, 0.8, 1.0, 2.0, 4.0, 6.0, 8.0, 10.0,
20.0, 40.0, 60.0, 80.0])

y = np.array([0.50505332505407008, 1.1207373784533172, 2.1981844719020001,
3.1746209003398689, 4.2905482471260044, 6.2816226678076958,
11.073788414382639, 23.248479770546009, 32.120462301367183,
44.036117671229206, 54.009003143831116, 102.7077685684846,
185.72880217806673, 256.12183145545811, 301.97120103079675])

# Our model is y = a * x, so things are quite simple, in this case...
# x needs to be a column vector instead of a 1D vector for this, however.
x = x[:,np.newaxis]
a, _, _, _ = np.linalg.lstsq(x, y)

plt.plot(x, y, 'bo')
plt.plot(x, a*x, 'r-')
plt.show()
``````

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