A Canonical Transform for Strengthening the Local Lp-Type Universal Approximation Property

Abstract

Most Lp-type universal approximation theorems guarantee that a given machine learning model class F⊂eq C(Rd,RD) is dense in Lpμ(Rd,RD) for any suitable finite Borel measure μ on Rd. Unfortunately, this means that the model's approximation quality can rapidly degenerate outside some compact subset of Rd, as any such measure is largely concentrated on some bounded subset of Rd. This paper proposes a generic solution to this approximation theoretic problem by introducing a canonical transformation which "upgrades F's approximation property" in the following sense. The transformed model class, denoted by F-tope, is shown to be dense in Lpμ,strict(Rd,RD) which is a topological space whose elements are locally p-integrable functions and whose topology is much finer than usual norm topology on Lpμ(Rd,RD); here μ is any suitable σ-finite Borel measure μ on Rd. Next, we show that if F is any family of analytic functions then there is always a strict "gap" between F-tope's expressibility and that of F, since we find that F can never dense in Lpμ,strict(Rd,RD). In the general case, where F may contain non-analytic functions, we provide an abstract form of these results guaranteeing that there always exists some function space in which F-tope is dense but F is not, while, the converse is never possible. Applications to feedforward networks, convolutional neural networks, and polynomial bases are explored.