2015
COLT
COLT 2015
Learning with Square Loss: Localization through Offset Rademacher Complexity
Abstract
We consider regression with square loss and general classes of functions without the boundedness assumption. We introduce a notion of offset Rademacher complexity that provides a transparent way to study localization both in expectation and in high probability. For any (possibly non-convex) class, the excess loss of a two-step estimator is shown to be upper bounded by this offset complexity through a novel geometric inequality. In the convex case, the estimator reduces to an empirical risk minimizer. The method recovers the results of \citepRakSriTsy15 for the bounded case while also providing guarantees without the boundedness assumption.
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Trend Setter
— Regression
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Keyword Pioneer
— offset rademacher complexity
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Hot Topic Early Bird
— statistical learning
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