Explicit integral representations and quantitative bounds for two-layer ReLU networks

Abstract

An approach to construct explicit integral representations for two-layer ReLU networks is presented, which provides relatively simple representations for any multivariate polynomial. Quantitative bounds are provided for a particular, sharpened ReLU integral representation, which involves a harmonic extension and a projection. The bounds demonstrate that functions can be approximated with L2(D) errors that do not depend explicitly on dimension or degree, but rather the coefficients of their monomial expansions and the distribution D. We also present a connection to the RKHS of the exponential kernel K(x,y)=( x,y ), and a very simple integral representation involving additionally multiplication via a fixed function which has better quantitative bounds.