Transformed primal-dual methods for nonlinear saddle point systems

IF 4.3 3区 材料科学 Q1 ENGINEERING, ELECTRICAL & ELECTRONIC
Long Chen, Jingrong Wei
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引用次数: 1

Abstract

Abstract A transformed primal-dual (TPD) flow is developed for a class of nonlinear smooth saddle point system. The flow for the dual variable contains a Schur complement which is strongly convex. Exponential stability of the saddle point is obtained by showing the strong Lyapunov property. Several TPD iterations are derived by implicit Euler, explicit Euler, implicit-explicit and Gauss-Seidel methods with accelerated overrelaxation of the TPD flow. Generalized to the symmetric TPD iterations, linear convergence rate is preserved for convex-concave saddle point systems under assumptions that the regularized functions are strongly convex. The effectiveness of augmented Lagrangian methods can be explained as a regularization of the non-strongly convexity and a preconditioning for the Schur complement. The algorithm and convergence analysis depends crucially on appropriate inner products of the spaces for the primal variable and dual variable. A clear convergence analysis with nonlinear inexact inner solvers is also developed.
非线性鞍点系统的变换原对偶方法
摘要针对一类非线性光滑鞍点系统,建立了一种变换的原对偶流。对偶变量流包含一个强凸的Schur补。通过证明强李雅普诺夫性质,得到了鞍点的指数稳定性。采用隐式欧拉法、显式欧拉法、隐式-显式法和高斯-赛德尔法推导了TPD流的多次迭代,并加速了TPD流的超松弛。推广到对称TPD迭代,在正则函数为强凸的假设下,凸凹鞍点系统保持线性收敛速率。增广拉格朗日方法的有效性可以解释为非强凸性的正则化和舒尔补的先决条件。该算法和收敛性分析关键取决于原变量和对偶变量空间的适当内积。并给出了非线性非精确内解的清晰收敛分析。
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来源期刊
CiteScore
7.20
自引率
4.30%
发文量
567
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