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I am relatively new to machine learning and am trying to place decision tree induction into the grand scheme of things. Are decision trees (for example, those built with C4.5 or ID3) considered parametric or nonparametric? I would guess that they may be indeed parametric because the decision split points for real values may be determined from some distribution of features values, for example the mean. However, they do not share the nonparametric characteristic of having to keep all the original training data (like one would do with kNN).

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The term "parametric" refers to parameters that define the distribution of the data. Since decision trees such as C4.5 don't make an assumption regarding the distribution of the data, they are nonparametric. Gaussian Maximum Likelihood Classification (GMLC) is parametric because it assumes the data follow a multivariate Gaussian distribution (classes are characterized by means and covariances). With regard to your last sentence, retaining the training data (e.g., instance-based learning) is not common to all nonparametric classifiers. For example, artificial neural networks (ANN) are considered nonparametric but they do not retain the training data.

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What about the idea of the decision nodes' split point for real values being determined through some distribution? –  stackoverflowuser2010 Dec 12 '12 at 18:44
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A distribution is not required. You can sort all your instances by the value of your continuous attribute, then split between the two values that maximize the information gain. No assumption has been made regarding the distribution of the data (i.e., no assumption that the data are normally or otherwise distributed). –  bogatron Dec 12 '12 at 18:48
    
But let's say that a particular implementation of a decision tree uses a distribution to perform splitting. Then that would make it this implementation parametric, right? –  stackoverflowuser2010 Dec 12 '12 at 19:46
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The decision tree will still be a nonparametric classifier. Even though you may use a parametric model (e.g., a Gaussian distribution) for selecting potential branches, the ultimate decision surface produced by the tree will, in general, not correspond to Gaussian distributions of classes (neither implicitly nor explicitly). –  bogatron Dec 12 '12 at 20:23
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Thanks, great answer. –  stackoverflowuser2010 Dec 12 '12 at 21:06
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