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Zeroth-Order Regularized Optimization (ZORO): Approximately Sparse Gradients and Adaptive Sampling

HanQin Cai, Daniel McKenzie, Wotao Yin, Zhenliang Zhang

2022SIAM Journal on Optimization29 citationsDOIOpen Access PDF

Abstract

We consider the problem of minimizing a high-dimensional objective function, which may include a regularization term, using only (possibly noisy) evaluations of the function. Such optimization is also called derivative-free, zeroth-order, or black-box optimization. We propose a new zeroth-order regularized optimization method, dubbed ZORO. When the underlying gradient is approximately sparse at an iterate, ZORO needs very few objective function evaluations to obtain a new iterate that decreases the objective function. We achieve this with an adaptive, randomized gradient estimator, followed by an inexact proximal-gradient scheme. Under a novel approximately sparse gradient assumption and various different convex settings, we show that the (theoretical and empirical) convergence rate of ZORO is only logarithmically dependent on the problem dimension. Numerical experiments show that ZORO outperforms existing methods with similar assumptions, on both synthetic and real datasets.

Topics & Concepts

MathematicsProximal Gradient MethodsRegularization (linguistics)Optimization problemRate of convergenceEstimatorConvex optimizationMathematical optimizationConvex functionApplied mathematicsDimension (graph theory)Function (biology)AlgorithmRegular polygonComputer scienceKey (lock)StatisticsCombinatoricsBiologyArtificial intelligenceComputer securityEvolutionary biologyGeometrySparse and Compressive Sensing TechniquesStochastic Gradient Optimization TechniquesAdvanced Optimization Algorithms Research
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