Optimality condition and iterative thresholding algorithm for [Formula: see text]-regularization problems

This paper investigates the [Formula: see text]-regularization problems, which has a broad applications in compressive sensing, variable selection problems and sparse least squares fitting for high dimensional data. We derive the exact lower bounds for the absolute value of nonzero entries in each g...

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Vydané v:SpringerPlus Ročník 5; číslo 1; s. 1873
Hlavní autori: Jiao, Hongwei, Chen, Yongqiang, Yin, Jingben
Médium: Journal Article
Jazyk:English
Vydavateľské údaje: Switzerland 2016
Predmet:
[Formula: see text]-regularization problems
Iterative thresholding algorithm
Optimality condition
Global optimum solution
Fixed point
ISSN:2193-1801, 2193-1801
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Shrnutí:This paper investigates the [Formula: see text]-regularization problems, which has a broad applications in compressive sensing, variable selection problems and sparse least squares fitting for high dimensional data. We derive the exact lower bounds for the absolute value of nonzero entries in each global optimal solution of the model, which clearly demonstrates the relation between the sparsity of the optimum solution and the choice of the regularization parameter and norm. We also establish the necessary condition for global optimum solutions of [Formula: see text]-regularization problems, i.e., the global optimum solutions are fixed points of a vector thresholding operator. In addition, by selecting parameters carefully, a global minimizer which will have certain desired sparsity can be obtained. Finally, an iterative thresholding algorithm is designed for solving the [Formula: see text]-regularization problems, and any accumulation point of the sequence generated by the designed algorithm is convergent to a fixed point of the vector thresholding operator.
Bibliografia:ObjectType-Article-1
SourceType-Scholarly Journals-1
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ISSN:2193-1801
2193-1801
DOI:10.1186/s40064-016-3516-3