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I am following the example shown in, where a one class SVM is used for anomaly detection. Now, this may be a notation unique to scikit-learn, but I couldn't find an explanation of how to use the parameter nu given to the OneClassSVM constructor.

In, it is stated that the parameter nu is a reparametrization of the parameter C (which is the regularization parameter which I am familiar with) - but doesn't state how to perform that reparameterization.

Both a formula and an intuition will be much appreciated.


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ν is certainly not scikit-learn-specific; see this tutorial by Chen, Lin and Schölkopf, starting from p. 13 (first Google hit for "nu svm"). – Fred Foo Jun 27 '12 at 16:39
up vote 15 down vote accepted

The problem with C and the introduction of nu

The problem with the parameter C is:

  1. that it can take any positive value
  2. that it has no direct interpretation.

It is therefore hard to choose correctly and one has to resort to cross validation or direct experimentation to find a suitable value.

In response Schölkopf et al. reformulated SVM to take a new regularization parameter nu. This parameter is:

  1. bounded between 0 and 1
  2. has a direct interpretation

Interpretation of nu

The parameter nu is an upper bound on the fraction of margin errors and a lower bound of the fraction of support vectors relative to the total number of training examples. For example, if you set it to 0.05 you are guaranteed to find at most 5% of your training examples being misclassified (at the cost of a small margin, though) and at least 5% of your training examples being support vectors.

Relationship between C and nu

The relation between C and nu is governed by the following formula:

nu = A+B/C

A and B are constants which are unfortunately not that easy to calculate.


The takeaway message is that C and nu SVM are equivalent regarding their classification power. The regularization in terms of nu is easier to interpret compared to C, but the nu SVM is usually harder to optimize and runtime doesn't scale as well as the C variant with number of input samples.

More details (including formulas for A and B) can be found here: Chang CC, Lin CJ - "Training nu-support vector classifiers: theory and algorithms"

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It is not strictly true that "you are guaranteed" than nu is a bound like you wrote. In fact, this only holds true for nu in its admissible interval (see p. 123 of Appl. Stochastic Models Bus. Ind., 2005; 21:111–136). Another problem is that in Fig. 5 of the same reference, the relationship between nu and C is not like the one you quote. This answer should be qualified. PS: I would be interested in knowing what this interval is in the case of 1-class SVM: in the reference I cited, Proposition 3 p. 126 only gives the 2-class SVM admissible interval for nu. – EOL Apr 12 '13 at 8:31
Dear @Bernhard Kausler, can you please have a look a question I posted:… – leon Jul 3 '14 at 11:18

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