Entropy and Learning of Lipschitz Functions under Log-Concave Measures

Abstract

We study regression of 1-Lipschitz functions under a log-concave measure μ on Rd. We focus on the high-dimensional regime where the sample size n is subexponential in d, in which distribution-free estimators are ineffective. We analyze two polynomial-based procedures: the projection estimator, which relies on knowledge of an orthogonal polynomial basis of μ, and the least-squares estimator over low-degree polynomials, which requires no knowledge of μ whatsoever. Their risk is governed by the rate of polynomial approximation of Lipschitz functions in L2(μ). When this rate matches the Gaussian one, we show that both estimators achieve minimax bounds over a wide range of parameters. A key ingredient is sharp entropy estimates for the class of 1-Lipschitz functions in L2(μ), which are new even in the Gaussian setting.