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We study the large-width asymptotics of random fully connected neural networks with weights drawn from -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 W^s, p (U) for integrability indices p < and suitable smoothness indices s depending on the activation function of the neural network, and establish the functional convergence of the processes in P (W^s, p (U) ). This convergence result is leveraged in the study of functional posteriors for edge-preserving Bayesian inverse problems with stable neural network priors.
Tomás Soto (Thu,) studied this question.