An Extended ADMM for 3-Block Nonconvex Nonseparable Problems with Applications

Abstract

We consider a 3-block Alternating Direction Method of Multipliers (ADMM) for solving nonconvex nonseparable problems with a linear constraint. Inspired by [Sun, Toh and Yang, SIAM Journal on Optimization, 25 (2015), pp.882-915]wtwice, the proposed ADMM follows the Block Coordinate Descent (BCD) cycle order 1 3 2 3. We analyze its convergence based on the Kurdyka-ojasiewicz property. We also discuss two useful extensions of the proposed ADMM with 2 3 1 3 Gauss-Seidel BCD cycle order, and with adding a proximal term for more general nonseparable problems, respectively. Moreover, we make numerical experiments on two nonconvex problems: robust principal component analysis and nonnegative matrix completion. Results show the efficiency and outperformance of the proposed ADMM.