Parameter identification for Hammerstein nonlinear system with polynomial and state space model

Abstract: This study investigates a two-stage parameter identification algorithm for the Hammerstein nonlinear system based on special test signals. The studied Hammerstein nonlinear system has a static nonlinear subsystem represented by polynomial basis function and a dynamic linear subsystem described by canonical observable state space model, and special test signals composed of binary signals and random signals are applied to parameter identification separation of the nonlinear subsystem and linear subsystem. The de… Show more

“…Set hyperparameters in the presented method as S 0 = 0.999, ρ = 1.0, λ = 0, and α = 0.25. To certificate the effectiveness of the proposed NFM and its estimate technique, BP neural network, 37 Kalman filtering, 38 and polynomial model 39 are also used for comparison of nonlinear block fitting. Table 3 shows error comparison of nonlinearity fitting based on three modeling methods, where mean squared error ($$$ \mathrm{MSE}=\frac{1}{N}\sum \limits_{t=1}^N{\left({\mathrm{observed}}_t-{\mathrm{predicted}}_t\right)}^2 $$$) and mean absolute error ($$$ \mathrm{MAE}=\frac{1}{N}\sum \limits_{t=1}^N\left(\left|{\mathrm{observed}}_t-{\mathrm{predicted}}_t\right|\right) $$$) are involved.…”

“…Set hyperparameters in the presented method as S 0 = 0.999, 𝜌 = 1.0, 𝜆 = 0, and 𝛼 = 0.25. To certificate the effectiveness of the proposed NFM and its estimate technique, BP neural network, 37 Kalman filtering, 38 and polynomial model 39 are also used for comparison of nonlinear block fitting. Table 3 shows error comparison of nonlinearity fitting based on three modeling methods, where mean squared error…”

Estimation of wiener nonlinear systems with measurement noises utilizing correlation analysis and Kalman filter

“…Set hyperparameters in the presented method as S 0 = 0.999, ρ = 1.0, λ = 0, and α = 0.25. To certificate the effectiveness of the proposed NFM and its estimate technique, BP neural network, 37 Kalman filtering, 38 and polynomial model 39 are also used for comparison of nonlinear block fitting. Table 3 shows error comparison of nonlinearity fitting based on three modeling methods, where mean squared error ($$$ \mathrm{MSE}=\frac{1}{N}\sum \limits_{t=1}^N{\left({\mathrm{observed}}_t-{\mathrm{predicted}}_t\right)}^2 $$$) and mean absolute error ($$$ \mathrm{MAE}=\frac{1}{N}\sum \limits_{t=1}^N\left(\left|{\mathrm{observed}}_t-{\mathrm{predicted}}_t\right|\right) $$$) are involved.…”

“…Set hyperparameters in the presented method as S 0 = 0.999, 𝜌 = 1.0, 𝜆 = 0, and 𝛼 = 0.25. To certificate the effectiveness of the proposed NFM and its estimate technique, BP neural network, 37 Kalman filtering, 38 and polynomial model 39 are also used for comparison of nonlinear block fitting. Table 3 shows error comparison of nonlinearity fitting based on three modeling methods, where mean squared error…”

Estimation of wiener nonlinear systems with measurement noises utilizing correlation analysis and Kalman filter

“…Some parameters are difficult to obtain, and the aging process is difficult to monitor [27]. In [28][29], according to the relationship between the time constant of the chip junction temperature cooling curve and Cauer model parameters, the Cauer model parameters of IGBT module were directly obtained by fitting the cooling curve. This method needs to obtain multiple sets of equations under different heat dissipation conditions, and the calculation process is complex.…”

Monitoring method of solder layer void damage of IGBT module based on transfer function

Estimation of Wiener Model Based on Neural Fuzzy Network