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arxiv 1905.00529 v1 pith:SYV4PQ3H submitted 2019-05-01 cs.LG math.OCstat.ML

Stabilized SVRG: Simple Variance Reduction for Nonconvex Optimization

classification cs.LG math.OCstat.ML
keywords svrgepsilonsimplestationaryfindnonconvexpointsecond-order
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Variance reduction techniques like SVRG provide simple and fast algorithms for optimizing a convex finite-sum objective. For nonconvex objectives, these techniques can also find a first-order stationary point (with small gradient). However, in nonconvex optimization it is often crucial to find a second-order stationary point (with small gradient and almost PSD hessian). In this paper, we show that Stabilized SVRG (a simple variant of SVRG) can find an $\epsilon$-second-order stationary point using only $\widetilde{O}(n^{2/3}/\epsilon^2+n/\epsilon^{1.5})$ stochastic gradients. To our best knowledge, this is the first second-order guarantee for a simple variant of SVRG. The running time almost matches the known guarantees for finding $\epsilon$-first-order stationary points.

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    Diffusion learning achieves linear-rate agreement around the network centroid in stochastic non-convex distributed optimization.