Nonlinear regression + Cross Validation = possible?

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Hello. World. I want to know is it possible to perform cross validation on nonlinear regression model?

Accepted Answer

Star Strider
Star Strider on 16 Jun 2017
Cross-validation is used to assess the performance of classifiers.
Nonlinear regression does curve fitting (objective function parameter estimation).
These are two entirely different statistical techniques. What are you doing? How would you use cross-validation with your nonlinear regression?
  19 Comments
Star Strider
Star Strider on 21 Jun 2017
I’m here occasionally these days.
I looked at the subplot problem when you posted it. I would not use subplot in that situation, instead just plotting all the data on one set of axes and using a legend call.
wesleynotwise
wesleynotwise on 21 Jun 2017
Edited: wesleynotwise on 21 Jun 2017
Ah. I still need subplot in my case, due to the overlapping of data points, and it is easy for me to do the analysis. I think I have an idea now how to crack it. Thanks.

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More Answers (1)

Greg Heath
Greg Heath on 22 Jun 2017
Edited: Greg Heath on 22 Jun 2017
I am surprised to hear that SS thinks that cross validation is not used for regression.
Maybe it is just a misunderstanding of terminology but I have used crossvalidation in regression many times.
Typically it is used when there are mounds of data:
1. Randomly divide the data into k subsets.
2. Then design a neural network model with two subsets: one for training
and one for validation.
3. Test the net on the remaining k-2 subsets.
4. If performance of one net is poor, the same data can be used several
(say 10) times with different random initial weights. Then, choose the
best of the 10.
5. Finally you can choose the best of the k nets or combine m (<=k) nets
Hope this helps.
Thank you for formally accepting my answer
Greg
  4 Comments
Greg Heath
Greg Heath on 22 Jun 2017
Edited: Greg Heath on 22 Jun 2017
It doesn't matter what your model is you can still use
1. k-fold cross-validation where there are k distinct subsets
2. k-fold bootstrapping where there are k nondistinct random subsets.
A driving factor is the ratio of fitting equations to the number of parameters that have to be estimated.
Hope this helps.
Greg
wesleynotwise
wesleynotwise on 22 Jun 2017
Edited: wesleynotwise on 22 Jun 2017
Yes. Star Strider did point out that I was actually looking for bootstrap sampling techniques. My tiny wee brain cannot cope with that at the moment, that's why I used the alternative - data splitting.
Thanks :)

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