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Given a collection of (N+1)-dimensional real valued vectors with N independent and 1 dependent value, I would like to compute a polynomial of degree 1 (linear), 2 (quadratic) or higher that provides a reasonably good fit (e.g. as determined by least squares error). In other words, when applied to the elements of the collection, the polynomial should map the independent values of each one to the associated dependent value (with some reasonable margin of error).

I expect the dimensionality of the independent variables to be in the range 2..8, and to work on collections of 20..200 elements. I am hoping to fit a polynomial in milliseconds rather than seconds. :-)

I quickly found algorithms for polynomial regression for one-dimensional data, but I have not been able to come up with anything practical for multi-dimensional data. I am interested primarily in algorithm descriptions or source code. Any pointers?

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You might want to try asking your question on stats.stackexchange.com. –  Jean-Philippe Pellet Jul 4 '11 at 12:13

2 Answers 2

up vote 3 down vote accepted

You might want to explore the Weka data mining and machine learning platform - it's extremely comprehensive and includes all kinds of different regression algorithms.

A big bonus is that it is all open source so you can also study the code if you like.

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I was just going to write the same. –  Rekin Jul 4 '11 at 12:21

I was looking for the same code and I have found two good examples of this.

See net.sourceforge.openforecast

Specifically see the class PolynomialRegressionModel as a starting point

and a simple single class implementation which is designed for much larger data sets than you mentioned


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The class PolynomialRegressionModel referred to only does single variable regression. –  Matt Munson Jul 3 '12 at 20:10

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