Gradientless Descent: High-Dimensional Zeroth-Order Optimization

November 14, 2019 ยท Declared Dead ยท ๐Ÿ› International Conference on Learning Representations

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Authors Daniel Golovin, John Karro, Greg Kochanski, Chansoo Lee, Xingyou Song, Qiuyi Zhang arXiv ID 1911.06317 Category cs.LG: Machine Learning Cross-listed math.OC, stat.ML Citations 83 Venue International Conference on Learning Representations Last Checked 4 months ago
Abstract
Zeroth-order optimization is the process of minimizing an objective $f(x)$, given oracle access to evaluations at adaptively chosen inputs $x$. In this paper, we present two simple yet powerful GradientLess Descent (GLD) algorithms that do not rely on an underlying gradient estimate and are numerically stable. We analyze our algorithm from a novel geometric perspective and present a novel analysis that shows convergence within an $ฮต$-ball of the optimum in $O(kQ\log(n)\log(R/ฮต))$ evaluations, for any monotone transform of a smooth and strongly convex objective with latent dimension $k < n$, where the input dimension is $n$, $R$ is the diameter of the input space and $Q$ is the condition number. Our rates are the first of its kind to be both 1) poly-logarithmically dependent on dimensionality and 2) invariant under monotone transformations. We further leverage our geometric perspective to show that our analysis is optimal. Both monotone invariance and its ability to utilize a low latent dimensionality are key to the empirical success of our algorithms, as demonstrated on BBOB and MuJoCo benchmarks.
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