JOURNAL ARTICLE
Subsampled cubic regularization method for finite-sum minimization
Year: 2024 Journal: Optimization Vol: 74 (7)Pages: 1591-1614 Publisher: Taylor & Francis
Abstract
This paper proposes and analyses a subsampled Cubic Regularization Method (CRM) for solving finite-sum optimization problems. The new method uses random subsampling techniques to approximate the functions, gradients and Hessians in order to reduce the overall computational cost of the CRM. Under suitable hypotheses, first- and second-order iteration-complexity bounds and global convergence analyses are presented. We also discuss the local convergence properties of the method. Numerical experiments are presented to illustrate the performance of the proposed scheme.
Keywords:
Mathematics Regularization (linguistics) Monotone cubic interpolation Minification Applied mathematics Mathematical optimization Mathematical analysis Computer science Artificial intelligence
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Topics
Advanced Optimization Algorithms Research
Physical Sciences → Mathematics → Numerical Analysis
Sparse and Compressive Sensing Techniques
Physical Sciences → Engineering → Computational Mechanics
Stochastic Gradient Optimization Techniques
Physical Sciences → Computer Science → Artificial Intelligence
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