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arxiv: 1502.06134 · v3 · pith:7QOAL2NYnew · submitted 2015-02-21 · 📊 stat.ML · cs.LG· math.ST· stat.TH

Learning with Square Loss: Localization through Offset Rademacher Complexity

classification 📊 stat.ML cs.LGmath.STstat.TH
keywords complexitylossoffsetassumptionboundedboundednesscaseestimator
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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 \citep{RakSriTsy15} for the bounded case while also providing guarantees without the boundedness assumption.

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