ON THE GLOBAL LINEAR CONVERGENCE OF THE ADMM WITH MULTIBLOCK VARIABLES

被引:107
|
作者
Lin, Tianyi [1 ]
Ma, Shiqian [1 ]
Zhang, Shuzhong [2 ]
机构
[1] Chinese Univ Hong Kong, Dept Syst Engn & Engn Management, Shatin, Hong Kong, Peoples R China
[2] Univ Minnesota, Dept Ind & Syst Engn, Minneapolis, MN 55455 USA
来源
SIAM JOURNAL ON OPTIMIZATION | 2015年 / 25卷 / 03期
关键词
alternating direction method of multipliers; global linear convergence; convex optimization; ALTERNATING DIRECTION METHOD; SPLITTING ALGORITHMS; MULTIPLIERS;
D O I
10.1137/140971178
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The alternating direction method of multipliers (ADMM) has been widely used for solving structured convex optimization problems. In particular, the ADMM can solve convex programs that minimize the sum of N convex functions whose variables are linked by some linear constraints. While the convergence of the ADMM for N = 2 was well established in the literature, it remained an open problem for a long time whether the ADMM for N >= 3 is still convergent. Recently, it was shown in [Chen et al., Math. Program. (2014), DOI 10.1007/s10107-014-0826-5.] that without additional conditions the ADMM for N >= 3 generally fails to converge. In this paper, we show that under some easily verifiable and reasonable conditions the global linear convergence of the ADMM when N >= 3 can still be ensured, which is important since the ADMM is a popular method for solving large-scale multiblock optimization models and is known to perform very well in practice even when N >= 3. Our study aims to offer an explanation for this phenomenon.
引用
收藏
页码:1478 / 1497
页数:20
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