SparseNet: Coordinate Descent With Nonconvex Penalties

SparseNet: Coordinate Descent With Nonconvex Penalties

We address the problem of sparse selection in linear models. A number of nonconvex penalties have been proposed in the literature for this purpose, along with a variety of convex-relaxation algorithms for finding good solutions. In this article we pursue a coordinate-descent approach for optimizatio...

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Veröffentlicht in:Journal of the American Statistical Association 2011-09, Vol.106 (495), p.1125-1138
Hauptverfasser: Mazumder, Rahul, Friedman, Jerome H., Hastie, Trevor
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Applications
Calculus of variations and optimal control
Calibration
Computational methods
Convergence
Coordinate systems
Degrees of freedom
Error rates
Estimators
Exact sciences and technology
Experiments
Fines & penalties
General topics
LASSO
Linear models
Linear regression
Mathematical analysis
Mathematical minima
Mathematical models
Mathematics
Methodology
Modeling
Nonconvex optimization
Numerical analysis
Numerical analysis. Scientific computation
Numerical methods in mathematical programming, optimization and calculus of variations
Numerical methods in optimization and calculus of variations
Optimization algorithms
Probability and statistics
Regularization surface
Sciences and techniques of general use
Sparse regression
Statistics
Theory and Methods
Threshing
Variable coefficients
Variable selection
Vector-autoregressive models
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Beschreibung
Zusammenfassung:We address the problem of sparse selection in linear models. A number of nonconvex penalties have been proposed in the literature for this purpose, along with a variety of convex-relaxation algorithms for finding good solutions. In this article we pursue a coordinate-descent approach for optimization, and study its convergence properties. We characterize the properties of penalties suitable for this approach, study their corresponding threshold functions, and describe a df-standardizing reparametrization that assists our pathwise algorithm. The MC+ penalty is ideally suited to this task, and we use it to demonstrate the performance of our algorithm. Certain technical derivations and experiments related to this article are included in the Supplementary Materials section.
ISSN:0162-1459
1537-274X
DOI:10.1198/jasa.2011.tm09738