2008
DOI: 10.1007/s10444-008-9077-4
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Multiparameter regularization for Volterra kernel identification via multiscale collocation methods

Abstract: Identification of the Volterra system is an ill-posed problem. We propose a regularization method for solving this ill-posed problem via a multiscale collocation method with multiple regularization parameters corresponding to the multiple scales. Many highly nonlinear problems such as flight data analysis demand identifying the system of a high order. This task requires huge computational costs due to processing a dense matrix of a large order. To overcome this difficulty a compression strategy is introduced t… Show more

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Cited by 8 publications
(11 citation statements)
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“…It can be seen from Fig. 4 that the function reconstructed by the standard DNN model (3.1) has large errors in the interval [3,5].…”
Section: An Example Of Adaptive Function Approximation By the Sdnn Modelmentioning
confidence: 99%
See 1 more Smart Citation
“…It can be seen from Fig. 4 that the function reconstructed by the standard DNN model (3.1) has large errors in the interval [3,5].…”
Section: An Example Of Adaptive Function Approximation By the Sdnn Modelmentioning
confidence: 99%
“…For neurons in different layers, corresponding to different transformation scales, the corresponding features have different levels of importance. Imposing different regularization parameters for different scales was proved to be an effective way to deal with multi-scale regularization problems [3,6,32]. Inspired by multiscale analysis, we propose a sparse regularization network model by applying different sparse regularization penalties to the neuron connections in different layers.…”
Section: Introductionmentioning
confidence: 99%
“…It should be noted that this identification problem is ill-posed in that the objective is to determine the structure of the system from input and output measurements [17]. Therefore, to obtain stable kernel estimation, a regularization method must be used to solve the least square problem.…”
Section: Volterra Seriesmentioning
confidence: 99%
“…Kibangoua et al [56] proposed a new constructive procedure for selecting a generalized orthonormal basis in the case of second-order Volterra systems. Another approach is presented by Brenner et al [10], they proposed to identify the Volterra kernel thanks to a regularisation method using a multiscale collocation method and to approximate the full matrix of the Volterra kernel by an sparse matrix. The leastsquares method was used to identify the sparse Volterra kernels of nonlinear bridge aerodynamics from a numerical simulation and a wind-tunnel experiment (see [108]).…”
Section: Identification Of the Volterra Kernelsmentioning
confidence: 99%