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).

- Are there any other Python options for performing constrained least squares fits?
- Or are there python routines for performing Lasso
Regression or Ridge Regression or some other regression method
which penalizes large
`b`

coefficient values?