Shallow ReLUs Networks in Lp-Type and Sobolev Spaces: Approximation and Path-Norm Controlled Generalization

Abstract

This paper studies approximation by shallow ReLUs networks, σs(t)=\0,t\s, together with their generalization behavior under 1 path-norm control. For the Lp-type integral spaces Fp,τd,s, 1 p2, spherical harmonic analysis yields approximation bounds for shallow networks. In particular, when τd is the uniform measure and 1 p<2, the approximation rate is O\!(m-p(2s+2d+1)-2d2dp) for 1 p p* and O\!(m-p(4s+3d-1)-2d+24dp) for p*<p<2, where p*=2d+2d+3. Approximation bounds for Sobolev spaces Wα,p, 1 p<2, are obtained through embeddings into spectral Barron spaces. For nonparametric regression with sub-Gaussian noise, path-norm-regularized shallow ReLUs networks achieve minimax-optimal rates O\!(n-d+2s+12d+2s+1 n) over Bs and O\!(n-2α2α+d n) over Wα,∞, with matching lower bounds up to logarithmic factors.