Recently, there has been great interest in connections between continuous-time dynamical systems and optimization methods, notably in the context of accelerated methods for smooth and unconstrained problems. In this paper we extend this perspective to nonsmooth and constrained problems by obtaining differential inclusions associated to novel accelerated variants of the alternating direction method of multipliers (ADMM). Through a Lyapunov analysis, we derive rates of convergence for these dynamical systems in different settings that illustrate an interesting tradeoff between decaying versus constant damping strategies. We also obtain modified equations capturing fine-grained details of these methods, which have improved stability and preserve the leading order convergence rates. An extension to general nonlinear equality and inequality constraints in connection with singular perturbation theory is provided.
翻译:最近,人们对连续时间动态系统与优化方法之间的联系非常感兴趣,特别是在加速解决顺利和不受限制问题的方法方面。在本文件中,我们通过获得与乘数交替方向方法(ADMM)的新型加速变体相关的差异性包容,将这一视角扩大到非平稳和受限制的问题。通过Lyapunov分析,我们得出不同环境中这些动态系统的趋同率,表明衰减与持续阻塞战略之间的平衡。我们还获得了反映这些方法的细微细节的经修改的方程式,这些变方程式改善了稳定性,并保留了主要的顺序趋同率。我们提供了与奇点扰动理论相关的一般非线性平等和不平等限制的延伸。
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