60 research outputs found
On the Global Linear Convergence of the ADMM with Multi-Block Variables
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 convex functions with
-block variables linked by some linear constraints. While the convergence of
the ADMM for was well established in the literature, it remained an open
problem for a long time whether or not the ADMM for is still
convergent. Recently, it was shown in [3] that without further conditions the
ADMM for may actually fail to converge. In this paper, we show that
under some easily verifiable and reasonable conditions the global linear
convergence of the ADMM when can still be assured, which is important
since the ADMM is a popular method for solving large scale multi-block
optimization models and is known to perform very well in practice even when
. Our study aims to offer an explanation for this phenomenon
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