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Hauptverfasser: Chen, Guangyong, Xue, Peng, Gan, Min, Chen, Jing, Guo, Wenzhong, Chen, C. L. Philip.
Format: Preprint
Veröffentlicht: 2024
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2402.13865
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author Chen, Guangyong
Xue, Peng
Gan, Min
Chen, Jing
Guo, Wenzhong
Chen, C. L. Philip.
author_facet Chen, Guangyong
Xue, Peng
Gan, Min
Chen, Jing
Guo, Wenzhong
Chen, C. L. Philip.
contents This paper delves into an in-depth exploration of the Variable Projection (VP) algorithm, a powerful tool for solving separable nonlinear optimization problems across multiple domains, including system identification, image processing, and machine learning. We first establish a theoretical framework to examine the effect of the approximate treatment of the coupling relationship among parameters on the local convergence of the VP algorithm and theoretically prove that the Kaufman's VP algorithm can achieve a similar convergence rate as the Golub \& Pereyra's form. These studies fill the gap in the existing convergence theory analysis, and provide a solid foundation for understanding the mechanism of VP algorithm and broadening its application horizons. Furthermore, drawing inspiration from these theoretical revelations, we design a refined VP algorithm for handling separable nonlinear optimization problems characterized by large residual, called VPLR, which boosts the convergence performance by addressing the interdependence of parameters within the separable model and by continually correcting the approximated Hessian matrix to counteract the influence of large residual during the iterative process. The effectiveness of this refined algorithm is corroborated through numerical experimentation.
format Preprint
id arxiv_https___arxiv_org_abs_2402_13865
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Variable Projection Algorithms: Theoretical Insights and A Novel Approach for Problems with Large Residual
Chen, Guangyong
Xue, Peng
Gan, Min
Chen, Jing
Guo, Wenzhong
Chen, C. L. Philip.
Optimization and Control
This paper delves into an in-depth exploration of the Variable Projection (VP) algorithm, a powerful tool for solving separable nonlinear optimization problems across multiple domains, including system identification, image processing, and machine learning. We first establish a theoretical framework to examine the effect of the approximate treatment of the coupling relationship among parameters on the local convergence of the VP algorithm and theoretically prove that the Kaufman's VP algorithm can achieve a similar convergence rate as the Golub \& Pereyra's form. These studies fill the gap in the existing convergence theory analysis, and provide a solid foundation for understanding the mechanism of VP algorithm and broadening its application horizons. Furthermore, drawing inspiration from these theoretical revelations, we design a refined VP algorithm for handling separable nonlinear optimization problems characterized by large residual, called VPLR, which boosts the convergence performance by addressing the interdependence of parameters within the separable model and by continually correcting the approximated Hessian matrix to counteract the influence of large residual during the iterative process. The effectiveness of this refined algorithm is corroborated through numerical experimentation.
title Variable Projection Algorithms: Theoretical Insights and A Novel Approach for Problems with Large Residual
topic Optimization and Control
url https://arxiv.org/abs/2402.13865