Acceleration and restart for the randomized Bregman-Kaczmarz method

IF 1 3区 数学 Q1 MATHEMATICS
Lionel Tondji , Ion Necoara , Dirk A. Lorenz
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引用次数: 0

Abstract

Optimizing strongly convex functions subject to linear constraints is a fundamental problem with numerous applications. In this work, we propose a block (accelerated) randomized Bregman-Kaczmarz method that only uses a block of constraints in each iteration to tackle this problem. We consider a dual formulation of this problem in order to deal in an efficient way with the linear constraints. Using convex tools, we show that the corresponding dual function satisfies the Polyak-Lojasiewicz (PL) property, provided that the primal objective function is strongly convex and verifies additionally some other mild assumptions. However, adapting the existing theory on coordinate descent methods to our dual formulation can only give us sublinear convergence results in the dual space. In order to obtain convergence results in some criterion corresponding to the primal (original) problem, we transfer our algorithm to the primal space, which combined with the PL property allows us to get linear convergence rates. More specifically, we provide a theoretical analysis of the convergence of our proposed method under different assumptions on the objective and demonstrate in the numerical experiments its superior efficiency and speed up compared to existing methods for the same problem.

随机布雷格曼-卡茨马兹法的加速和重启
在线性约束条件下优化强凸函数是一个基本问题,应用广泛。在这项工作中,我们提出了一种分块(加速)随机 Bregman-Kaczmarz 方法,该方法在每次迭代中只使用一个约束块来解决这个问题。我们考虑了这一问题的对偶表述,以便有效地处理线性约束。利用凸工具,我们证明了相应的对偶函数满足 Polyak-Lojasiewicz (PL) 属性,前提是原始目标函数为强凸函数,并验证了其他一些温和的假设。然而,将现有的坐标下降方法理论应用于我们的对偶公式只能得到对偶空间的亚线性收敛结果。为了获得与基元(原始)问题相对应的某些准则的收敛结果,我们将算法转移到基元空间,结合 PL 特性,我们可以获得线性收敛率。更具体地说,我们对我们提出的方法在不同目标假设下的收敛性进行了理论分析,并在数值实验中证明了与现有方法相比,我们的方法在相同问题上具有更高的效率和更快的速度。
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来源期刊
CiteScore
2.20
自引率
9.10%
发文量
333
审稿时长
13.8 months
期刊介绍: Linear Algebra and its Applications publishes articles that contribute new information or new insights to matrix theory and finite dimensional linear algebra in their algebraic, arithmetic, combinatorial, geometric, or numerical aspects. It also publishes articles that give significant applications of matrix theory or linear algebra to other branches of mathematics and to other sciences. Articles that provide new information or perspectives on the historical development of matrix theory and linear algebra are also welcome. Expository articles which can serve as an introduction to a subject for workers in related areas and which bring one to the frontiers of research are encouraged. Reviews of books are published occasionally as are conference reports that provide an historical record of major meetings on matrix theory and linear algebra.
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