2020
DOI: 10.1007/s10589-020-00227-6
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Tractable ADMM schemes for computing KKT points and local minimizers for $$\ell _0$$-minimization problems

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Cited by 9 publications
(5 citation statements)
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“…3.2 . Both regimes (significantly different as noted, e.g., by [ 36 ]) are met in the case of sparse linear regression treated in Sect. 3.3 .…”
Section: Introductionmentioning
confidence: 76%
See 1 more Smart Citation
“…3.2 . Both regimes (significantly different as noted, e.g., by [ 36 ]) are met in the case of sparse linear regression treated in Sect. 3.3 .…”
Section: Introductionmentioning
confidence: 76%
“…Interestingly enough, most of the papers using purely continuous reformulations of problems involving in an explicit way, either in the objective or in the constraint, focus on local solutions via NLP solvers, with considerable success, demonstrated by convergence results and impressive empirical findings; see, e.g. [ 14 , 22 , 25 , 36 ].…”
Section: Introductionmentioning
confidence: 99%
“…An advantage of using a surrogate, as opposed to directly solving a discrete optimization problem, is computational efficiency. Many existing methods involving the 0 -function, e.g., best subset selection and cardinality constraint, introduce auxiliary binary integer variables [4,14] or reformulate the problem using complementarity constraints [6,12,34]. The potential burden of increased computational time from such reformulations could be addressed by using continuous functions instead, and we will demonstrate the effectiveness of the proposed approach in the § 4.…”
Section: Difference-of-convex Approximationmentioning
confidence: 94%
“…In [333], an ADMM was designed for the relaxed reformulation of the cardinality regularization problem 0 -reg(ρ, Ax ≥ b), and the authors of [343] use the observation that…”
Section: Other Relaxations Of Cardinality Constraintsmentioning
confidence: 99%
“…Nevertheless, in case f is convex and thus f N ≡ 0, solving the minimization problem with regards to (v , w ) reduces to projecting (x, y ) onto the set of points (v , w ) with v i (1 − w i ) = 0 for all i ∈ [n], for which a closed-form solution is available. A closed-form solution for a nonconvex, but quadratic function f N is given in [333]. Moreover, recall that ADMM schemes are also popular for convex 1 -based models, cf.…”
Section: Other Relaxations Of Cardinality Constraintsmentioning
confidence: 99%