Integral Representations of Sobolev Spaces via ReLUk Activation Function and Optimal Error Estimates for Linearized Networks

Abstract

This paper presents two main theoretical results concerning shallow neural networks with ReLUk activation functions. We establish a novel integral representation for Sobolev spaces, showing that every function in Hd+2k+12() can be expressed as an L2-weighted integral of ReLUk ridge functions over the unit sphere. This result mirrors the known representation of Barron spaces and highlights a fundamental connection between Sobolev regularity and neural network representations. Moreover, we prove that linearized shallow networks -- constructed by fixed inner parameters and optimizing only the linear coefficients -- achieve optimal approximation rates O(n-12-2k+12d) in Sobolev spaces.