Smoothing augmented Lagrangian method for nonsmooth constrained optimization problems

Xu, Mengwei; Ye, Jane J.; Zhang, Liwei

doi:10.1007/s10898-014-0242-7

Cited by 13 publications

(5 citation statements)

References 52 publications

(54 reference statements)

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“…Our approach is closely related to Moreau-Yosida smoothing (see section 2 and [61]), which is used by many well-known algorithms, including those of [7,79], and [77]. If we partially minimize (7) with respect to w rather than with respect to x, we arrive at the problem min x h ν (Ax) + g(x), (11) with h ν analogous to the smoother discussed in [61].…”

Section: Related Workmentioning

confidence: 99%

Relax-and-split method for nonconvex inverse problems

Zheng

Aravkin

2020

Inverse Problems

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We develop and analyze a new ‘relax-and-split’ (RS) approach for inverse problems modeled using nonsmooth nonconvex optimization formulations. RS uses a relaxation technique together with partial minimization, and brings classic techniques including direct factorization, matrix decompositions, and fast iterative methods to bear on nonsmooth nonconvex problems. We also extend the approach to robustify any such inverse problem through trimming, a mechanism that robustifies inverse problems to measurement outliers. We then show practical performance of RS and trimmed RS (TRS) on a diverse set of problems, including: (1) phase retrieval, (2) semi-supervised classification, (3) stochastic shortest path problems, and (4) nonconvex clustering. RS/TRS are easy to implement, competitive with existing methods, and show promising results on difficult inverse problems with nonsmooth and nonconvex features.

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Section: Related Workmentioning

confidence: 99%

Relax-and-split method for nonconvex inverse problems

Zheng

Aravkin

2020

Inverse Problems

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“…In [25,26], an algorithm using the branch and bound in combination with the exchange technique was proposed to find approximate global optimal solutions. Recently, the smoothing techniques were used to find stationary points of the valued function or the combined reformulation of simple bilevel programs [20,38,39,40].…”

Section: Introductionmentioning

confidence: 99%

“…Over the past two decades, many numerical algorithms were proposed for solving bilevel programs. However, most of them assume that the lower level program is convex, with few exceptions [20,25,26,31,38,39,40]. In [25,26], an algorithm using the branch and bound in combination with the exchange technique was proposed to find approximate global optimal solutions.…”

Section: Introductionmentioning

confidence: 99%

Bilevel Polynomial Programs and Semidefinite Relaxation Methods

Nie¹,

Wang²,

Ye³

2017

SIAM J. Optim.

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Abstract. A bilevel program is an optimization problem whose constraints involve the solution set to another optimization problem parameterized by upper level variables. This paper studies bilevel polynomial programs (BPPs), i.e., all the functions are polynomials. We reformulate BPPs equivalently as semi-infinite polynomial programs (SIPPs), using Fritz John conditions and Jacobian representations. Combining the exchange technique and Lasserre type semidefinite relaxations, we propose a numerical method for solving bilevel polynomial programs. For simple BPPs, we prove the convergence to global optimal solutions. Numerical experiments are presented to show the efficiency of the proposed algorithm.

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“…Smoothing techniques are closely related to our approach; Moreau-Yosida smoothing (see Section 2) and related method of Nesterov (2005) are at the core of many well-known algorithms, including those of Becker et al (2011), Zhang (2011), andXu et al (2015). If we partially minimize (7) with respect to w rather than with respect to x, we arrive at the problem min…”

Section: Related Workmentioning

confidence: 99%

Relax-and-split method for nonsmooth nonconvex problems

Zheng,

Aravkin

2018

Preprint

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We develop and analyze a new 'relax-and-split' (RS) approach for compositions of separable nonconvex nonsmooth functions with linear maps. RS uses a relaxation technique together with partial minimization, and brings classic techniques including direct factorization, matrix decompositions, and fast iterative methods to bear on nonsmooth nonconvex problems. We also extend the approach to trimmed nonconvex-composite formulations; the resulting Trimmed RS (TRS) can fit models while detecting outliers in the data.We then test RS and TRS on a diverse set of applications: (1) phase retrieval, (2) stochastic shortest path problems, (3) semi-supervised classification, and (4) new clustering approaches. RS/TRS can be applied to models with very weak functional assumptions, are easy to implement, competitive with existing methods, and enable a new level of modeling formulations to be put forward to address emerging challenges in the mathematical sciences.

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Smoothing augmented Lagrangian method for nonsmooth constrained optimization problems

Cited by 13 publications

References 52 publications

Relax-and-split method for nonconvex inverse problems

Relax-and-split method for nonconvex inverse problems

Bilevel Polynomial Programs and Semidefinite Relaxation Methods

Relax-and-split method for nonsmooth nonconvex problems

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