Related papers: Accelerated SGD for Non-Strongly-Convex Least Squares

Accelerated SGD for Non-Strongly-Convex Least Squares

URL: http://arxiv.org/abs/2203.01744v1
Date: Thu, 3 Mar 2022 14:39:33 GMT
Title: Accelerated SGD for Non-Strongly-Convex Least Squares
Authors: Aditya Varre, Nicolas Flammarion
Abstract summary: We consider approximation for the least squares regression problem in the non-strongly convex setting. We present the first practical algorithm that achieves the optimal prediction error rates in terms of dependence on the noise of the problem.
Score: 14.010916616909743
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We consider stochastic approximation for the least squares regression problem in the non-strongly convex setting. We present the first practical algorithm that achieves the optimal prediction error rates in terms of dependence on the noise of the problem, as $O(d/t)$ while accelerating the forgetting of the initial conditions to $O(d/t^2)$. Our new algorithm is based on a simple modification of the accelerated gradient descent. We provide convergence results for both the averaged and the last iterate of the algorithm. In order to describe the tightness of these new bounds, we present a matching lower bound in the noiseless setting and thus show the optimality of our algorithm.

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