# Constrained Linear Regression in Python

I have a classic linear regression problem of the form:

`y = X b`

where `y` is a response vector `X` is a matrix of input variables and `b` is the vector of fit parameters I am searching for.

Python provides `b = numpy.linalg.lstsq( X , y )` for solving problems of this form.

However, when I use this I tend to get either extremely large or extremely small values for the components of `b`.

I'd like to perform the same fit, but constrain the values of `b` between 0 and 255.

It looks like `scipy.optimize.fmin_slsqp()` is an option, but I found it extremely slow for the size of problem I'm interested in (`X` is something like `3375 by 1500` and hopefully even larger).

1. Are there any other Python options for performing constrained least squares fits?
2. Or are there python routines for performing Lasso Regression or Ridge Regression or some other regression method which penalizes large `b` coefficient values?
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Also Openopt has bindings to bvls, another bounded linear lsq solver.

Edit: You could also try if scipy.opimize.nnls is enough.

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Nice, on the surface that sounds like exactly what I need. Being able to provide weights to the `X` input variable matrix rows may actually also be very useful to me (I do have a sense of the reliability of various data points which that may let me take advantage of). I'll definitely give it a try, thanks! –  ulmangt Apr 14 '12 at 15:58
It is not really good tested through, hope it will work for you. Code is pure python and should be easy to test. –  tillsten Apr 14 '12 at 15:59
`scipy.opimize.nnls` is a good tip as well. Simply constraining to non-negative values may indeed be enough. `numpy.linalg.lstsq` solutions seemed to be balancing out huge positive `b` values with equally huge negative `b` values. –  ulmangt Apr 14 '12 at 19:05

You mention you would find Lasso Regression or Ridge Regression acceptable. These and many other constrained linear models are available in the scikit-learn package. Check out the section on generalized linear models.

Usually constraining the coefficients involves some kind of regularization parameter (C or alpha)---some of the models (the ones ending in CV) can use cross validation to automatically set these parameters. You can also further constrain models to use only positive coefficents---for example, there is an option for this on the Lasso model.

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