Some Unified Theory for Variance Reduced Prox-Linear Methods

Abstract

This work considers the nonconvex, nonsmooth problem of minimizing a composite objective of the form f(g(x))+h(x) where the inner mapping g is a smooth finite summation or expectation amenable to variance reduction. In such settings, prox-linear methods can enjoy variance-reduced speed-ups despite the existence of nonsmoothness. We provide a unified convergence theory applicable to a wide range of common variance-reduced vector and Jacobian constructions. All the technical conditions we required for variance-reduced methods can be summarized in a single unified assumption. Our theory (i) only requires operator norm bounds on Jacobians (whereas prior works used potentially much larger Frobenius norms), (ii) provides state-of-the-art high probability guarantees, and (iii) allows inexactness in proximal computations.

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