1., Carpenter and H. Kenneth, "A comparison of magnetic hysteresis models under high frequency excitation," American Physical Society, Annual March Meeting, Mar. 17-21, 1997. Google Scholar
2. Nouicer, A., M. E. H. Latreche, M. Feliach, R. Mehasni, and M. Boubia, "Identification of the parameters of the modified Lorentz function modelling hysteresis cycle," International Journal of Applied Electromagnetics and Mechanics, Vol. 25, 165-171, 2007.
doi:10.1109/20.179569 Google Scholar
3. Bertotti, G., "Dynamic generalization of the scalar Preisach model of hysteresis," IEEE Trans. Magn., Vol. 28, 2599-2601, Sep. 1992. Google Scholar
4. Bertotti, G., F. Fiorillo, and M. Pasquale, "Measurement and prediction of dynamic loop shapes and power losses in soft magnetic materials," IEEE Trans. Magn., Vol. 29, 13-16, Nov. 1993.
doi:10.1016/S0921-4526(01)00993-0 Google Scholar
5. Fuzi, J. and A. Ivanyi, "Features of two rate-dependent hysteresis models," Physica B, Vol. 306, 137-142, 2001.
doi:10.1109/20.281206 Google Scholar
6. Jiles, D. C., "Frequency dependence of hysteresis curves in non- conducting magnetic materials," IEEE Trans. Magn., Vol. 29, 3490-3492, Nov. 1993.
doi:10.1109/63.575667 Google Scholar
7. Hsu, J. T. and K. D. T. Ngo, "A Hammerstein-based dynamic model for hysteresis phenomenon," IEEE Trans. Power Electron., Vol. 2, 406-413, May 1997.
doi:10.1109/TMAG.2004.831001 Google Scholar
8. Nakmahachalasint, P., K. D. T. Ngo, and L. Vu-Quoc, "A behavioral model for frequency-dependent hysteresis in power ferrites," IEEE Trans. on Magn., Vol. 40, No. 4, 1784-1790, Jul. 2004. Google Scholar
9. Nouicer, A. and M. E. H. Latreche, "A neural network model of magnetic hysteresis taking into account the influence of the frequency and the temperature," 1st International Conference on Manufacturing Engineering, ICMEN, Sani, Halkidiki, Greece, Oct. 2002. Google Scholar
