基于惯性和Hessian驱动阻尼的一阶优化方法中微扰的影响

IF 1.3 4区 数学 Q1 MATHEMATICS
H. Attouch, J. Fadili, V. Kungurtsev
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引用次数: 2

摘要

具有粘性和Hessian驱动阻尼的二阶连续时间耗散动力系统激发了求解凸优化问题的有效一阶算法。在保持nesterov型加速度的快速收敛特性的同时,Hessian驱动的阻尼使得显著衰减振荡成为可能。为了研究这些算法相对于扰动的稳定性,我们分析了当梯度计算受到外生加性误差时相应连续系统的行为。我们提供了两种类型的系统的渐近行为的定量分析,那些隐式和显式黑森驱动阻尼。考虑在实数Hilbert空间上定义的凸函数、强凸函数和非光滑目标函数,并证明了不同的摄动可积条件足以维持系统的收敛速率。我们强调了隐式和显式黑森阻尼之间的区别,并特别指出隐式情况下所需的客观和扰动的假设比显式情况下更严格。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On the effect of perturbations in first-order optimization methods with inertia and Hessian driven damping
Second-order continuous-time dissipative dynamical systems with viscous and Hessian driven damping have inspired effective first-order algorithms for solving convex optimization problems. While preserving the fast convergence properties of the Nesterov-type acceleration, the Hessian driven damping makes it possible to significantly attenuate the oscillations. To study the stability of these algorithms with respect to perturbations, we analyze the behaviour of the corresponding continuous systems when the gradient computation is subject to exogenous additive errors. We provide a quantitative analysis of the asymptotic behaviour of two types of systems, those with implicit and explicit Hessian driven damping. We consider convex, strongly convex, and non-smooth objective functions defined on a real Hilbert space and show that, depending on the formulation, different integrability conditions on the perturbations are sufficient to maintain the convergence rates of the systems. We highlight the differences between the implicit and explicit Hessian damping, and in particular point out that the assumptions on the objective and perturbations needed in the implicit case are more stringent than in the explicit case.
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来源期刊
Evolution Equations and Control Theory
Evolution Equations and Control Theory MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
3.10
自引率
6.70%
发文量
5
期刊介绍: EECT is primarily devoted to papers on analysis and control of infinite dimensional systems with emphasis on applications to PDE''s and FDEs. Topics include: * Modeling of physical systems as infinite-dimensional processes * Direct problems such as existence, regularity and well-posedness * Stability, long-time behavior and associated dynamical attractors * Indirect problems such as exact controllability, reachability theory and inverse problems * Optimization - including shape optimization - optimal control, game theory and calculus of variations * Well-posedness, stability and control of coupled systems with an interface. Free boundary problems and problems with moving interface(s) * Applications of the theory to physics, chemistry, engineering, economics, medicine and biology
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