Deep Learning in High Dimension: Neural Network Approximation of Analytic Functions in L2(Rd,γd)

Abstract

For artificial deep neural networks, we prove expression rates for analytic functions f:Rd in the norm of L2(Rd,γd) where d∈ N\ ∞ \. Here γd denotes the Gaussian product probability measure on Rd. We consider in particular ReLU and ReLUk activations for integer k≥ 2. For d∈N, we show exponential convergence rates in L2(Rd,γd). In case d=∞, under suitable smoothness and sparsity assumptions on f:RN, with γ∞ denoting an infinite (Gaussian) product measure on RN, we prove dimension-independent expression rate bounds in the norm of L2(RN,γ∞). The rates only depend on quantified holomorphy of (an analytic continuation of) the map f to a product of strips in Cd. As an application, we prove expression rate bounds of deep ReLU-NNs for response surfaces of elliptic PDEs with log-Gaussian random field inputs.