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Asymptotic Optimality in Stochastic Optimization

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arxiv 1612.05612 v4 pith:2TMPNNKG submitted 2016-12-16 math.ST math.OCstat.MLstat.TH

Asymptotic Optimality in Stochastic Optimization

classification math.ST math.OCstat.MLstat.TH
keywords stochasticoptimizationproblemsconstraintsresultsconvergencedevelopmentgradient
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We study local complexity measures for stochastic convex optimization problems, providing a local minimax theory analogous to that of H\'{a}jek and Le Cam for classical statistical problems. We give complementary optimality results, developing fully online methods that adaptively achieve optimal convergence guarantees. Our results provide function-specific lower bounds and convergence results that make precise a correspondence between statistical difficulty and the geometric notion of tilt-stability from optimization. As part of this development, we show how variants of Nesterov's dual averaging---a stochastic gradient-based procedure---guarantee finite time identification of constraints in optimization problems, while stochastic gradient procedures fail. Additionally, we highlight a gap between problems with linear and nonlinear constraints: standard stochastic-gradient-based procedures are suboptimal even for the simplest nonlinear constraints, necessitating the development of asymptotically optimal Riemannian stochastic gradient methods.

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