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Suboptimality of Penalized Empirical Risk Minimization in Classification

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  • Guillaume Lecu'e

    (PMA)

Abstract

Let $\cF$ be a set of $M$ classification procedures with values in $[-1,1]$. Given a loss function, we want to construct a procedure which mimics at the best possible rate the best procedure in $\cF$. This fastest rate is called optimal rate of aggregation. Considering a continuous scale of loss functions with various types of convexity, we prove that optimal rates of aggregation can be either $((\log M)/n)^{1/2}$ or $(\log M)/n$. We prove that, if all the $M$ classifiers are binary, the (penalized) Empirical Risk Minimization procedures are suboptimal (even under the margin/low noise condition) when the loss function is somewhat more than convex, whereas, in that case, aggregation procedures with exponential weights achieve the optimal rate of aggregation.

Suggested Citation

  • Guillaume Lecu'e, 2007. "Suboptimality of Penalized Empirical Risk Minimization in Classification," Papers math/0703811, arXiv.org.
  • Handle: RePEc:arx:papers:math/0703811
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    References listed on IDEAS

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    1. Bartlett, Peter L. & Jordan, Michael I. & McAuliffe, Jon D., 2006. "Convexity, Classification, and Risk Bounds," Journal of the American Statistical Association, American Statistical Association, vol. 101, pages 138-156, March.
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