For separable nonlinear least squares models, a variable projection algorithm based on matrix factorization is studied, and the ill-conditioning of the model parameters is considered in the specific solution process of the model. When the linear parameters are estimated, the Tikhonov regularization method is used to solve the ill-conditioned problems. When the nonlinear parameters are estimated, the QR decomposition, Gram–Schmidt orthogonalization decomposition, and SVD are applied in the Jacobian matrix. These methods are then compared with the method in which the variables are not separated. Numerical experiments are performed using RBF neural network data, and the experimental results are analyzed in terms of both qualitative and quantit...
We consider a class of non-linear least squares problems that are widely used in fitting experimenta...
Due to the simple structure and global approximation ability, single hidden layer neural networks ha...
This dissertation considers computational methods for solving linear and nonlinear least squares pro...
In this work, we combine the special structure of the separable nonlinear least squares problem with...
Consider the separable nonlinear least squares problem of finding ~a in R^n and ~alpha in R^k which,...
Abstract — In numerical linear algebra, the variable projec-tion (VP) algorithm has been a standard ...
A regression problem is separable if the model can be represented as a linear combination of functio...
The nonlinear least squares problem m i n y , z ∥ A ( y ) z + b ( y ) ∥ , where ...
Variable Projection (VarPro) is a framework to solve op- timization problems efficiently by optimall...
AbstractGiven the data (xi, yi), i=1, 2, …, n, the problem is to find the values of the linear and n...
The multiexponential analysis problem of fitting kinetic models to time-resolved spectra is often so...
Variable Projection (VarPro) is a framework to solve optimization problems efficiently by optimally ...
Three simplifying conditions are given for obtaining least squares (LS) estimates for a nonlinear su...
Abstract. We consider a class of non-linear least squares problems that are widely used in fitting e...
Nonlinear dynamic models are widely used for characterizing processes that govern complex biological...
We consider a class of non-linear least squares problems that are widely used in fitting experimenta...
Due to the simple structure and global approximation ability, single hidden layer neural networks ha...
This dissertation considers computational methods for solving linear and nonlinear least squares pro...
In this work, we combine the special structure of the separable nonlinear least squares problem with...
Consider the separable nonlinear least squares problem of finding ~a in R^n and ~alpha in R^k which,...
Abstract — In numerical linear algebra, the variable projec-tion (VP) algorithm has been a standard ...
A regression problem is separable if the model can be represented as a linear combination of functio...
The nonlinear least squares problem m i n y , z ∥ A ( y ) z + b ( y ) ∥ , where ...
Variable Projection (VarPro) is a framework to solve op- timization problems efficiently by optimall...
AbstractGiven the data (xi, yi), i=1, 2, …, n, the problem is to find the values of the linear and n...
The multiexponential analysis problem of fitting kinetic models to time-resolved spectra is often so...
Variable Projection (VarPro) is a framework to solve optimization problems efficiently by optimally ...
Three simplifying conditions are given for obtaining least squares (LS) estimates for a nonlinear su...
Abstract. We consider a class of non-linear least squares problems that are widely used in fitting e...
Nonlinear dynamic models are widely used for characterizing processes that govern complex biological...
We consider a class of non-linear least squares problems that are widely used in fitting experimenta...
Due to the simple structure and global approximation ability, single hidden layer neural networks ha...
This dissertation considers computational methods for solving linear and nonlinear least squares pro...