On the Equivalence of Regression and Classification

Abstract

A formal link between regression and classification has been tenuous. Even though the margin maximization term \|w\| is used in support vector regression, it has at best been justified as a regularizer. We show that a regression problem with M samples lying on a hyperplane has a one-to-one equivalence with a linearly separable classification task with 2M samples. We show that margin maximization on the equivalent classification task leads to a different regression formulation than traditionally used. Using the equivalence, we demonstrate a ``regressability'' measure, that can be used to estimate the difficulty of regressing a dataset, without needing to first learn a model for it. We use the equivalence to train neural networks to learn a linearizing map, that transforms input variables into a space where a linear regressor is adequate.

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