Litcius/Paper detail

Newton-Type Optimal Thresholding Algorithms for Sparse Optimization Problems

Nan Meng, Yun-Bin Zhao

2022Journal of the Operations Research Society of China11 citationsDOIOpen Access PDF

Abstract

Abstract Sparse signals can be possibly reconstructed by an algorithm which merges a traditional nonlinear optimization method and a certain thresholding technique. Different from existing thresholding methods, a novel thresholding technique referred to as the optimal k -thresholding was recently proposed by Zhao (SIAM J Optim 30(1):31–55, 2020). This technique simultaneously performs the minimization of an error metric for the problem and thresholding of the iterates generated by the classic gradient method. In this paper, we propose the so-called Newton-type optimal k -thresholding (NTOT) algorithm which is motivated by the appreciable performance of both Newton-type methods and the optimal k -thresholding technique for signal recovery. The guaranteed performance (including convergence) of the proposed algorithms is shown in terms of suitable choices of the algorithmic parameters and the restricted isometry property (RIP) of the sensing matrix which has been widely used in the analysis of compressive sensing algorithms. The simulation results based on synthetic signals indicate that the proposed algorithms are stable and efficient for signal recovery.

Topics & Concepts

ThresholdingRestricted isometry propertyAlgorithmMetric (unit)Iterated functionComputer scienceMinificationCompressed sensingConvergence (economics)MathematicsMathematical optimizationArtificial intelligenceImage (mathematics)Mathematical analysisEconomic growthOperations managementEconomicsSparse and Compressive Sensing TechniquesPhotoacoustic and Ultrasonic ImagingElectrical and Bioimpedance Tomography