Investigation of the Vector Jiles–Atherton Model and the Fixed Point Method Combined Technique for Time-Periodic Magnetic Problems

This paper presents a finite element analysis procedure for solving time-periodic magnetic field problems, employing the fixed point method and the vector Jiles-Atherton (J-A) model. To increase the modeling accuracy, multiple sets of the J-A model parameters are used. The convergence performance of the fixed point iteration is improved by calculating the fixed point coefficients of rolling and transverse directions independently, according to the differential reluctivities of the hysteresis loops. The finite element analysis algorithm incorporating the fixed point method and the vector J-A model with multisets of parameters is derived, and applied to analyze a single-phase transformer core laminated of electrical steel sheets. The convergence of the computation can be guaranteed if the fixed point coefficients are properly bounded. By comparing the numerical analysis results with the experimentally measured ones, the effectiveness of the proposed analysis method is investigated.

[1]  A. Arkkio,et al.  Locally Convergent Fixed-Point Method for Solving Time-Stepping Nonlinear Field Problems , 2007, IEEE Transactions on Magnetics.

[2]  A. Arkkio,et al.  A Fast Fixed-Point Method for Solving Magnetic Field Problems in Media of Hysteresis , 2008, IEEE Transactions on Magnetics.

[3]  Chang Seop Koh,et al.  An Improved Modeling of Vector Magnetic Properties of Electrical Steel Sheet for FEM Application and Its Experimental Verification , 2009 .

[4]  Wei Li,et al.  Hysteresis Modeling for Electrical Steel Sheets Using Improved Vector Jiles-Atherton Hysteresis Model , 2011, IEEE Transactions on Magnetics.

[5]  Florea I. Hantila,et al.  Polarization method for static fields , 2000 .

[6]  Nelson Sadowski,et al.  An inverse Jiles-Atherton model to take into account hysteresis in time-stepping finite-element calculations , 2002 .

[7]  A. Arkkio,et al.  Analysis of the Convergence of the Fixed-Point Method Used for Solving Nonlinear Rotational Magnetic Field Problems , 2008, IEEE Transactions on Magnetics.

[8]  A. Bergqvist,et al.  A simple vector generalization of the Jiles-Atherton model of hysteresis , 1996 .

[9]  Masato Enokizono,et al.  Iron loss properties of a practical rotating machine stator core at each manufacturing stage , 2010 .

[10]  M. E. Mathekga,et al.  Application of the Fixed Point Method for Solution in Time Stepping Finite Element Analysis Using the Inverse Vector Jiles-Atherton Model , 2011, IEEE Transactions on Magnetics.

[11]  A. Ivanyi Hysteresis in rotation magnetic field , 2000 .

[12]  N. Sadowski,et al.  Inverse Jiles-Atherton vector hysteresis model , 2004, IEEE Transactions on Magnetics.

[13]  J. Saitz,et al.  Newton-Raphson method and fixed-point technique in finite element computation of magnetic field problems in media with hysteresis , 1999 .

[14]  Maurizio Repetto,et al.  A Jiles-Atherton and fixed-point combined technique for time periodic magnetic field problems with hysteresis , 1995 .