Litcius/Paper detail

Recursive Variable Projection Algorithm for a Class of Separable Nonlinear Models

Min Gan, Yu Guan, Guangyong Chen, C. L. Philip Chen

2020IEEE Transactions on Neural Networks and Learning Systems63 citationsDOI

Abstract

In this article, we study the recursive algorithms for a class of separable nonlinear models (SNLMs) in which the parameters can be partitioned into a linear part and a nonlinear part. Such models are very common in machine learning, system identification, and signal processing. Utilizing the special structure of the SNLMs, we propose a recursive variable projection (RVP) algorithm, in which at each recursion, the linear parameters of the model are eliminated, and the nonlinear parameters are updated by the recursive Levenberg-Marquart algorithm. Then, based on the updated nonlinear parameters, the linear parameters are updated by the recursive least-squares algorithm. According to a convergence analysis of the RVP algorithm, the parameter estimation error is mean-square bounded. Numerical examples confirm the satisfactory performance of the proposed algorithm.

Topics & Concepts

Separable spaceClass (philosophy)Nonlinear systemAlgorithmVariable (mathematics)Projection (relational algebra)MathematicsComputer scienceArtificial intelligenceMathematical analysisPhysicsQuantum mechanicsControl Systems and IdentificationGaussian Processes and Bayesian InferenceModel Reduction and Neural Networks