Wide stable neural networks: Sample regularity, functional convergence and Bayesian inverse problems

Abstract

We study the large-width asymptotics of random fully connected neural networks with weights drawn from α-stable distributions, a family of heavy-tailed distributions arising as the limiting distributions in the Gnedenko-Kolmogorov heavy-tailed central limit theorem. We show that in an arbitrary bounded Euclidean domain U with smooth boundary, the random field at the infinite-width limit, characterized in previous literature in terms of finite-dimensional distributions, has sample functions in the fractional Sobolev-Slobodeckij-type quasi-Banach function space Ws,p(U) for integrability indices p < α and suitable smoothness indices s depending on the activation function of the neural network, and establish the functional convergence of the processes in the space of probability measures on Ws,p(U). This convergence result is leveraged in the study of functional posteriors for edge-preserving Bayesian inverse problems with stable neural network priors.

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