Litcius/Paper detail

An Accelerated Method for Derivative-Free Smooth Stochastic Convex Optimization

Eduard Gorbunov, Pavel Dvurechensky, Alexander Gasnikov

2022SIAM Journal on Optimization41 citationsDOI

Abstract

We consider an unconstrained problem of minimizing a smooth convex function which is only available through noisy observations of its values, the noise consisting of two parts. Similar to stochastic optimization problems, the first part is of stochastic nature. The second part is additive noise of unknown nature but bounded in absolute value. In the two-point feedback setting, i.e., when pairs of function values are available, we propose an accelerated derivative-free algorithm together with its complexity analysis. The complexity bound of our derivative-free algorithm is only by a factor of $\sqrt{n}$ larger than the bound for accelerated gradient-based algorithms, where $n$ is the dimension of the decision variable. We also propose a nonaccelerated derivative-free algorithm with a complexity bound similar to the stochastic gradient--based algorithm; that is, our bound does not have any dimension-dependent factor except logarithmic. Notably, if the difference between the starting point and the solution is a sparse vector, for both our algorithms, we obtain a better complexity bound if the algorithm uses an 1-norm proximal setup rather than the Euclidean proximal setup, which is a standard choice for unconstrained problems.

Topics & Concepts

MathematicsUpper and lower boundsBounded functionDimension (graph theory)LogarithmConvex functionMathematical optimizationRegular polygonNorm (philosophy)Convex optimizationCombinatoricsStochastic optimizationApplied mathematicsMathematical analysisPolitical scienceGeometryLawSparse and Compressive Sensing TechniquesStochastic Gradient Optimization TechniquesMarkov Chains and Monte Carlo Methods