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Nonconvex Variance Reduced Optimization with Arbitrary Sampling

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arxiv 1809.04146 v2 pith:ETASN5KV submitted 2018-09-11 math.OC

Nonconvex Variance Reduced Optimization with Arbitrary Sampling

classification math.OC
keywords samplinganalysisimportancemethodsarbitrarygeneralnon-convexoptimization
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We provide the first importance sampling variants of variance reduced algorithms for empirical risk minimization with non-convex loss functions. In particular, we analyze non-convex versions of SVRG, SAGA and SARAH. Our methods have the capacity to speed up the training process by an order of magnitude compared to the state of the art on real datasets. Moreover, we also improve upon current mini-batch analysis of these methods by proposing importance sampling for minibatches in this setting. Surprisingly, our approach can in some regimes lead to superlinear speedup with respect to the minibatch size, which is not usually present in stochastic optimization. All the above results follow from a general analysis of the methods which works with arbitrary sampling, i.e., fully general randomized strategy for the selection of subsets of examples to be sampled in each iteration. Finally, we also perform a novel importance sampling analysis of SARAH in the convex setting.

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Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Accelerating Mini-batch SARAH by Step Size Rules

    cs.LG 2019-06 unverdicted novelty 4.0

    MB-SARAH-RBB uses a random Barzilai-Borwein step size to accelerate mini-batch SARAH, with a linear convergence proof and improved complexity for strongly convex objectives.