Determination of the distribution function of Preisach's model using centred cycles

被引:18
作者
Bernard, Y [1 ]
Mendes, E
Ren, Z
机构
[1] Univ Paris 11, SUPERLEC, CNRS, LGEP, Gif Sur Yvette, France
[2] Univ Paris 06, Paris, France
关键词
hysteresis; modelling;
D O I
10.1108/03321640010347439
中图分类号
TP39 [计算机的应用];
学科分类号
081203 ; 0835 ;
摘要
A new method far the determination of the classical Preisach's model distribution Junction is developed. The proposed method determines numerically the distribution function from classical experimental measurements and does not make any assumption concerning the material type. The Preisach's triangle is discretised in a finite set of cells (about 200 cells are needed). Two ways for the determination of the discretised distribution function are presented The first assumes constant distribution junction value in each cell. The second determines the nodal values of the discretised distribution function and uses a bilinear interpolation technique to obtain the distribution function in any position of the Preisach's triangle. We also show that the proposed method can also be used to model the inverse distribution Junction. The comparison between modelled and experimental hysteresis curves for both major and minor cycles have shown the effectiveness of the proposed method.
引用
收藏
页码:997 / 1006
页数:10
相关论文
共 8 条
[1]   ANALYTICAL THEORY OF THE BEHAVIOUR OF FERROMAGNETIC MATERIALS [J].
BIORCI, G ;
PESCETTI, D .
NUOVO CIMENTO, 1958, 7 (06) :829-842
[2]   Hysteresis modeling [J].
Della Torre, E .
COMPEL-THE INTERNATIONAL JOURNAL FOR COMPUTATION AND MATHEMATICS IN ELECTRICAL AND ELECTRONIC ENGINEERING, 1998, 17 (5-6) :682-+
[3]   PARAMETER-IDENTIFICATION OF THE COMPLETE-MOVING-HYSTERESIS MODEL USING MAJOR LOOP DATA [J].
DELLATORRE, E ;
VAJDA, F .
IEEE TRANSACTIONS ON MAGNETICS, 1994, 30 (06) :4987-5000
[4]   MATHEMATICAL-MODELS OF HYSTERESIS [J].
MAYERGOYZ, ID .
PHYSICAL REVIEW LETTERS, 1986, 56 (15) :1518-1521
[5]   MOVING VECTOR PREISACH HYSTERESIS MODEL AND DELTA-M CURVES [J].
OSSART, F ;
DAVIDSON, R ;
CHARAP, SH .
IEEE TRANSACTIONS ON MAGNETICS, 1994, 30 (06) :4260-4262
[6]   About the magnetic aftereffect. [J].
Preisach, F. .
ZEITSCHRIFT FUR PHYSIK, 1935, 94 (5-6) :277-302
[7]  
TAKAHASHI N, 1998, 4 INT WORKSH EL MAGN, P183
[8]   EFFICIENT NUMERICAL IMPLEMENTATION OF COMPLETE-MOVING-HYSTERESIS MODELS (INVITED) [J].
VAJDA, F ;
DELLATORRE, E .
IEEE TRANSACTIONS ON MAGNETICS, 1993, 29 (02) :1532-1537