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Most Influential AISTATS 2019 Paper · 2026-03 edition

On The Convergence Of Stochastic Gradient Descent With Adaptive Stepsizes

Xiaoyu Li; Francesco Orabona

Venue
Conference on Artificial Intelligence and Statistics (AISTATS) 2019
Recognition
Most Influential AISTATS 2019 Paper (Rank No. 7)
Edition
2026-03
Impact factor
6
Certificate ID
048280c7c11b2406

Abstract

Stochastic gradient descent is the method of choice for large scale optimization of machine learning objective functions. Yet, its performance is greatly variable and heavily depends on the choice of the stepsizes. This has motivated a large body of research on adaptive stepsizes. However, there is currently a gap in our theoretical understanding of these methods, especially in the non-convex setting. In this paper, we start closing this gap: we theoretically analyze in the convex and non-convex settings a generalized version of the AdaGrad stepsizes. We show sufficient conditions for these stepsizes to achieve almost sure asymptotic convergence of the gradients to zero, proving the first guarantee for generalized AdaGrad stepsizes in the non-convex setting. Moreover, we show that these stepsizes allow to automatically adapt to the level of noise of the stochastic gradients in both the convex and non-convex settings, interpolating between O(1/T) and O(1/sqrt(T)), up to logarithmic terms.

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