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A Universally Optimal Multistage Accelerated Stochastic Gradient Method
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We study the problem of minimizing a strongly convex, smooth function when we have noisy estimates of its gradient. We propose a novel multistage accelerated algorithm that is universally optimal in the sense that it achieves the optimal rate both in the deterministic and stochastic case and operates without knowledge of noise characteristics. The algorithm consists of stages that use a stochastic version of Nesterov's method with a specific restart and parameters selected to achieve the fastest reduction in the bias-variance terms in the convergence rate bounds.
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Stochastic algorithms with geometric step decay converge linearly on sharp functions
Geometric step decay yields local linear convergence for stochastic algorithms on sharp nonconvex problems and gives matching or new guarantees for phase retrieval and blind deconvolution under Gaussian and heavy-tail...
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