Modeling of pH process using wavenet based Hammerstein model

Abstract This paper outlines an approach for developing a Hammerstein model for nonlinear dynamic systems. The nonlinearity is sought to be captured through functional approximation using wavelets cast in a wavenet structure. Nonlinear block of wavenet at input side is cascaded with a linear dynamic block described by a state space model. A sequential approach is used for development of static nonlinear and linear dynamic parts of the model. Configuration and parameters of the nonlinear wavenet structure are determined from near steady state data extracted from dynamic test data while the state space model parameters of the linear dynamic part are obtained using a subspace identification approach. This approach has been applied for modeling a strongly nonlinear pH process operated over a wide range of operating conditions.

[1]  Bhavik R. Bakshi,et al.  Wave‐net: a multiresolution, hierarchical neural network with localized learning , 1993 .

[2]  Shuzhi Sam Ge,et al.  Iterative Identification of Neuro-Fuzzy-Based Hammerstein Model with Global Convergence , 2005 .

[3]  Gérard Dreyfus,et al.  Training wavelet networks for nonlinear dynamic input-output modeling , 1998, Neurocomputing.

[4]  W. R. Cluett,et al.  A new approach to the identification of pH processes based on the Wiener model , 1995 .

[5]  Dale E. Seborg,et al.  Adaptive nonlinear control of a pH neutralization process , 1994, IEEE Trans. Control. Syst. Technol..

[6]  J.G. Smith,et al.  Modeling of pH process using recurrent neural network and wavenet , 2005, CIMSA. 2005 IEEE International Conference on Computational Intelligence for Measurement Systems and Applications, 2005..

[7]  E. Baeyens,et al.  Wiener model identification and predictive control of a pH neutralisation process , 2004 .

[8]  Qinghua Zhang,et al.  Using wavelet network in nonparametric estimation , 1997, IEEE Trans. Neural Networks.

[9]  Liuping Wang,et al.  Identification of time-varying pH processes using sinusoidal signals , 2005, Autom..

[10]  T. McAvoy,et al.  Integration of multilayer perceptron networks and linear dynamic models : a Hammerstein modeling approach , 1993 .

[11]  Sirish L. Shah,et al.  Identification of Hammerstein models using multivariate statistical tools , 1995 .

[12]  Stéphane Mallat,et al.  Characterization of Signals from Multiscale Edges , 2011, IEEE Trans. Pattern Anal. Mach. Intell..

[13]  János Abonyi,et al.  Identification and Control of Nonlinear Systems Using Fuzzy Hammerstein Models , 2000 .

[14]  Xiaorong He,et al.  Application of steady-state detection method based on wavelet transform , 2003, Comput. Chem. Eng..

[15]  Bart De Moor,et al.  N4SID: Subspace algorithms for the identification of combined deterministic-stochastic systems , 1994, Autom..

[16]  William L. Luyben,et al.  Nonlinear auto-tune identification , 1994 .