This work tackles the problem of expanding Volterra models using Laguerre functions. A strict global optimal solution is derived when each multidimensional kernel of the model is decomposed into a set of independent orthonormal bases, each of which parameterized by an individual Laguerre pole intended for representing the dominant dynamic of the kernel along a particular dimension. It is proved that the solution derived minimizes the upper bound of the squared norm of the error resulting from the practical truncation of the Laguerre series expansion into a finite number of function,. This is an extension of the results in Campello, Favier and Amaral [(2004). Optimal expansions of discrete-time Volterra models using Laguerre functions. Autom...
The present paper involves the approximation of nonlinear systems using Wiener/Volterra models with ...
This paper is concerned with the computation of uncertainty bounds for the expansion of uncertain Vo...
A novel technique for selecting the poles of orthonormal basis functions (OBF) in Volterra models of...
International audienceThis work tackles the problem of expanding Volterra models using Laguerre func...
This work is concerned with the optimization of Laguerre bases for the orthonormal series expansion ...
International audienceThis work is concerned with the optimization of Laguerre bases for the orthono...
This paper is concerned with the selection of optimal Laguerre bases for the orthonormal series expa...
New batch and adaptive methods are proposed to optimize the Volterra kernels expansions on a set of...
International audienceNew batch and adaptive methods are proposed to optimize the Volterra kernels e...
The present paper involves the approximation of nonlinear systems using Wiener/Volterra models with ...
A new solution for the problem of selecting poles of the two-parameter Kautz functions in Volterra m...
This work tackles the problem of modeling nonlinear systems using Volterra models based on Kautz fun...
An improved approach to determine exact search directions for the optimization of Volterra models ba...
This work tackles the problem of modeling nonlinear systems using Volterra models based on Kautz fun...
The optimality condition for the free parameter in a truncated Laguerre network in both continuous-t...
The present paper involves the approximation of nonlinear systems using Wiener/Volterra models with ...
This paper is concerned with the computation of uncertainty bounds for the expansion of uncertain Vo...
A novel technique for selecting the poles of orthonormal basis functions (OBF) in Volterra models of...
International audienceThis work tackles the problem of expanding Volterra models using Laguerre func...
This work is concerned with the optimization of Laguerre bases for the orthonormal series expansion ...
International audienceThis work is concerned with the optimization of Laguerre bases for the orthono...
This paper is concerned with the selection of optimal Laguerre bases for the orthonormal series expa...
New batch and adaptive methods are proposed to optimize the Volterra kernels expansions on a set of...
International audienceNew batch and adaptive methods are proposed to optimize the Volterra kernels e...
The present paper involves the approximation of nonlinear systems using Wiener/Volterra models with ...
A new solution for the problem of selecting poles of the two-parameter Kautz functions in Volterra m...
This work tackles the problem of modeling nonlinear systems using Volterra models based on Kautz fun...
An improved approach to determine exact search directions for the optimization of Volterra models ba...
This work tackles the problem of modeling nonlinear systems using Volterra models based on Kautz fun...
The optimality condition for the free parameter in a truncated Laguerre network in both continuous-t...
The present paper involves the approximation of nonlinear systems using Wiener/Volterra models with ...
This paper is concerned with the computation of uncertainty bounds for the expansion of uncertain Vo...
A novel technique for selecting the poles of orthonormal basis functions (OBF) in Volterra models of...