An Oracle Inequality for Clipped Regularized Risk Minimizers

Steinwart, Ingo, Hush, Don, Scovel, Clint

Dec-31-2007–Neural Information Processing Systems

We establish a general oracle inequality for clipped approximate minimizers of regularized empirical risks and apply this inequality to support vector machine (SVM) type algorithms. We then show that for SVMs using Gaussian RBF kernels for classification this oracle inequality leads to learning rates that are faster than the ones established in [9]. Finally, we use our oracle inequality to show that a simple parameter selection approach based on a validation set can yield the same fast learning rates without knowing the noise exponents which were required to be known a-priori in [9].

inequality, oracle inequality, theorem 2, (12 more...)

Neural Information Processing Systems

Dec-31-2007

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Country:
- North America > United States
  - New York (0.04)
  - New Mexico > Los Alamos County
    - Los Alamos (0.04)
- Europe > United Kingdom
  - England > Cambridgeshire > Cambridge (0.04)

Technology:
- Information Technology > Artificial Intelligence > Machine Learning > Statistical Learning > Support Vector Machines (0.57)

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