Jiles–Atherton model explained
In electromagnetism and materials science, the Jiles–Atherton model of magnetic hysteresis was introduced in 1984 by David Jiles and D. L. Atherton.[1] This is one of the most popular models of magnetic hysteresis. Its main advantage is the fact that this model enables connection with physical parameters of the magnetic material.[2] Jiles–Atherton model enables calculation of minor and major hysteresis loops. The original Jiles–Atherton model is suitable only for isotropic materials. However, an extension of this model presented by Ramesh et al.[3] and corrected by Szewczyk [4] enables the modeling of anisotropic magnetic materials.
Principles
of the magnetic material sample in Jiles–Atherton model is calculated in the following steps for each value of the magnetizing field
:
is calculated considering interdomain coupling
and magnetization
,
- anhysteretic magnetization
is calculated for effective magnetic field
,
of the sample is calculated by solving
ordinary differential equation taking into account sign of
derivative of magnetizing field
(which is the source of hysteresis).
Parameters
Original Jiles–Atherton model considers following parameters:
Parameter | Units | Description |
---|
| | Quantifies interdomain coupling in the magnetic material |
| A/m | Quantifies domain walls density in the magnetic material |
| A/m | Saturation magnetization of material |
| A/m | Quantifies average energy required to break pinning site in the magnetic material |
| | Magnetization reversibility | |
Extension considering uniaxial anisotropy introduced by Ramesh et al. and corrected by Szewczyk requires additional parameters:
Parameter | Units | Description |
---|
| J/m | Average anisotropy energy density |
| rad | Angle between direction of magnetizing field
and direction of anisotropy easy axis |
| | Participation of anisotropic phase in the magnetic material | |
Modelling the magnetic hysteresis loops
Effective magnetic field
Effective magnetic field
influencing on
magnetic moments within the material may be calculated from the following equation:
This effective magnetic field is analogous to the Weiss mean field acting on magnetic moments within a magnetic domain.
Anhysteretic magnetization
Anhysteretic magnetization can be observed experimentally, when magnetic material is demagnetized under the influence of constant magnetic field. However, measurements of anhysteretic magnetization are very sophisticated due to the fact, that the fluxmeter has to keep accuracy of integration during the demagnetization process. As a result, experimental verification of the model of anhysteretic magnetization is possible only for materials with negligible hysteresis loop.
Anhysteretic magnetization of typical magnetic material can be calculated as a weighted sum of isotropic and anisotropic anhysteretic magnetization:[5]
Isotropic
Isotropic anhysteretic magnetization
is determined on the base of
Boltzmann distribution. In the case of isotropic magnetic materials,
Boltzmann distribution can be reduced to
Langevin function connecting isotropic anhysteretic magnetization with effective magnetic field
:
Anisotropic
Anisotropic anhysteretic magnetization
is also determined on the base of
Boltzmann distribution. However, in such a case, there is no
antiderivative for the
Boltzmann distribution function. For this reason, integration has to be made numerically. In the original publication, anisotropic anhysteretic magnetization
is given as:
=
M | |
| s | | \pi | | \displaystyle\int | | eE(1)\sin\theta\cos\thetad\theta | | 0 | |
| | \pi | | \displaystyle\int | | eE(1)\sin\thetad\theta | | 0 | |
|
|
where
\begin{align}E(1)&=
\sin2(\psi-\theta)\\[4pt]
E(2)&=
\sin2(\psi+\theta)\end{align}
It should be highlighted, that a typing mistake occurred in the original Ramesh et al. publication. As a result, for an isotropic material (where
), the presented form of anisotropic anhysteretic magnetization
is not consistent with the isotropic anhysteretic magnetization
given by the Langevin equation. Physical analysis leads to the conclusion that the equation for anisotropic anhysteretic magnetization
has to be corrected to the following form:
=
M | |
| s | \displaystyle | \sin\theta\cos\thetad\theta |
| \displaystyle | \sin\thetad\theta |
|
|
In the corrected form, the model for anisotropic anhysteretic magnetization
was confirmed experimentally for anisotropic
amorphous alloys.
Magnetization as a function of magnetizing field
In Jiles–Atherton model, M(H) dependence is given in form of following ordinary differential equation:[6]
=
| Man-M |
\deltak-\alpha(Man-M) |
+
where
depends on direction of changes of magnetizing field
(
for increasing field,
for decreasing field)
Flux density as a function of magnetizing field
in the material is given as:
where
is
magnetic constant.
Vectorized Jiles–Atherton model
Vectorized Jiles–Atherton model is constructed as the superposition of three scalar models one for each principal axis.[7] This model is especially suitable for finite element method computations.
Numerical implementation
The Jiles–Atherton model is implemented in JAmodel, a MATLAB/OCTAVE toolbox. It uses the Runge-Kutta algorithm for solving ordinary differential equations. JAmodel is open-source is under MIT license.
The two most important computational problems connected with the Jiles–Atherton model were identified:[8]
dependence.For
numerical integration of the anisotropic anhysteretic magnetization
the
Gauss–Kronrod quadrature formula has to be used. In
GNU Octave this quadrature is implemented as
quadgk function.
For solving ordinary differential equation for
dependence, the
Runge–Kutta methods are recommended. It was observed, that the best performing was 4-th order fixed step method.
Further development
Since its introduction in 1984, Jiles–Atherton model was intensively developed. As a result, this model may be applied for the modeling of:
Moreover, different corrections were implemented, especially:
- to avoid unphysical states when reversible permeability is negative [15]
- to consider changes of average energy required to break pinning site [16]
Applications
Jiles–Atherton model may be applied for modeling:
- rotating electric machines [17]
- power transformers [18]
- magnetostrictive actuators [19]
- magnetoelastic sensors [20] [21]
- magnetic field sensors (e. g. fluxgates) [22] [23]
It is also widely used for electronic circuit simulation, especially for models of inductive components, such as transformers or chokes.[24]
See also
External links
Notes and References
- Jiles . D. C. . Atherton . D.L. . 1984 . Theory of ferromagnetic hysteresis . Journal of Applied Physics . 55 . 6. 2115 . 10.1063/1.333582 . 1984JAP....55.2115J .
- Liorzou . F. . Phelps . B. . Atherton . D. L. . 2000 . Macroscopic models of magnetization . IEEE Transactions on Magnetics . 36 . 2 . 418 . 10.1109/20.825802 . 2000ITM....36..418L .
- Ramesh . A. . Jiles . D. C. . Roderick . J. M. . 1996 . A model of anisotropic anhysteretic magnetization . IEEE Transactions on Magnetics . 32 . 5 . 4234 . 10.1109/20.539344 . 1996ITM....32.4234R .
- Szewczyk . R. . 2014 . Validation of the anhysteretic magnetization model for soft magnetic materials with perpendicular anisotropy . Materials . 7 . 7 . 5109–5116 . 10.3390/ma7075109 . 28788121 . 5455830 . 2014Mate....7.5109S . free .
- David Jiles . Jiles . D.C. . Ramesh . A. . Shi . Y. . Fang . X. . 1997 . Application of the anisotropic extension of the theory of hysteresis to the magnetization curves of crystalline and textured magnetic materials . IEEE Transactions on Magnetics . 33 . 5 . 3961 . 10.1109/20.619629 . 1997ITM....33.3961J . 38583653 .
- Jiles . D. C. . Atherton . D.L. . 1986 . A model of ferromagnetic hysteresis . Journal of Magnetism and Magnetic Materials . 61 . 1–2. 48 . 10.1016/0304-8853(86)90066-1 . 1986JMMM...61...48J .
- Szymanski . Grzegorz . Waszak . Michal . 2004 . Vectorized Jiles–Atherton hysteresis model . Physica B . 343 . 1–4. 26–29 . 10.1016/j.physb.2003.08.048. 2004PhyB..343...26S.
- Book: Szewczyk, R. . 2014 . Computational problems connected with Jiles–Atherton model of magnetic hysteresis . https://link.springer.com/chapter/10.1007/978-3-319-05353-0_27 . Recent Advances in Automation, Robotics and Measuring Techniques . Advances in Intelligent Systems and Computing . 267 . 275–283 . 10.1007/978-3-319-05353-0_27 . 978-3-319-05352-3 .
- Jiles . D.C. . 1994 . Modelling the effects of eddy current losses on frequency dependent hysteresis in electrically conducting media . IEEE Transactions on Magnetics . 30 . 6 . 4326–4328 . 10.1109/20.334076 . 1994ITM....30.4326J .
- Szewczyk . R. . Frydrych . P. . 2010 . Extension of the Jiles–Atherton model for modelling the frequency dependence of magnetic characteristics of amorphous alloy cores for inductive components of electronic devices . Acta Physica Polonica A . 118 . 5 . 782 . 10.12693/aphyspola.118.782 . 2010AcPPA.118..782S . free .
- Sablik . M.J. . Jiles . D.C. . 1993 . Coupled magnetoelastic theory of magnetic and magnetostrictive hysteresis . IEEE Transactions on Magnetics . 29 . 4 . 2113 . 10.1109/20.221036 . 1993ITM....29.2113S .
- Szewczyk . R. . Bienkowski . A. . 2003 . Magnetoelastic Villari effect in high-permeability Mn-Zn ferrites and modeling of this effect . Journal of Magnetism and Magnetic Materials . 254 . 284–286 . 10.1016/S0304-8853(02)00784-9 . 2003JMMM..254..284S .
- Jackiewicz . D. . Szewczyk . R. . Salach . J. . Bieńkowski . A. . 2014 . Application of extended Jiles–Atherton model for modelling the influence of stresses on magnetic characteristics of the construction steel . Acta Physica Polonica A . 126 . 1 . 392 . 10.12693/aphyspola.126.392. 2014AcPPA.126..392J . free .
- Szewczyk . R. . 2006 . Modelling of the magnetic and magnetostrictive properties of high permeability Mn-Zn ferrites . Pramana . 67 . 6 . 1165–1171 . 10.1007/s12043-006-0031-z . 2006Prama..67.1165S . 59468247 .
- Deane . J.H.B. . 1994 . Modeling the dynamics of nonlinear inductor circuits . IEEE Transactions on Magnetics . 30 . 5 . 2795–2801 . 10.1109/20.312521 . 1994ITM....30.2795D .
- Szewczyk . R. . 2007 . Extension of the model of the magnetic characteristics of anisotropic metallic glasses . Journal of Physics D: Applied Physics . 40 . 14. 4109–4113 . 10.1088/0022-3727/40/14/002 . 2007JPhD...40.4109S . 121390902 .
- Du . Ruoyang . Robertson . Paul . 2015 . Dynamic Jiles–Atherton Model for Determining the Magnetic Power Loss at High Frequency in Permanent Magnet Machines . IEEE Transactions on Magnetics . 51 . 6 . 7301210 . 10.1109/TMAG.2014.2382594 . 2015ITM....5182594D . 30752050 .
- Huang . Sy-Ruen . Chen . Hong-Tai . Wu . Chueh-Cheng. 2012 . Distinguishing internal winding faults from inrush currents in power transformers using Jiles–Atherton model parameters based on correlation voefficient . IEEE Transactions on Magnetics . 27 . 2 . 548 . 10.1109/TPWRD.2011.2181543 . 25854265 . etal.
- Calkins . F.T. . Smith . R.C. . Flatau . A.B.. Alison Flatau . 2008 . Energy-based hysteresis model for magnetostrictive transducers . IEEE Transactions on Magnetics . 36 . 2 . 429 . 10.1109/20.825804 . 2000ITM....36..429C . 10.1.1.44.9747 . 16468218 .
- Szewczyk . R. . Bienkowski . A. . 2004 . Application of the energy-based model for the magnetoelastic properties of amorphous alloys for sensor applications . Journal of Magnetism and Magnetic Materials . 272 . 728–730 . 10.1016/j.jmmm.2003.11.270 . 2004JMMM..272..728S .
- Szewczyk . R. . Salach . J. . Bienkowski . A.. 2012 . Application of extended Jiles–Atherton model for modeling the magnetic characteristics of Fe41.5Co41.5Nb3Cu1B13 alloy in as-quenched and nanocrystalline State . IEEE Transactions on Magnetics . 48 . 4 . 1389 . 10.1109/TMAG.2011.2173562 . 2012ITM....48.1389S . etal.
- Szewczyk . R. . 2008 . Extended Jiles–Atherton model for modelling the magnetic characteristics of isotropic materials . Acta Physica Polonica A . 113 . 1 . 67 . 10.12693/APhysPolA.113.67. 2008JMMM..320E1049S . free .
- Moldovanu . B.O. . Moldovanu . C. . Moldovanu . A. . 1996 . Computer simulation of the transient behaviour of a fluxgate magnetometric circuit . Journal of Magnetism and Magnetic Materials . 157-158 . 565–566 . 10.1016/0304-8853(95)01101-3 . 1996JMMM..157..565M .
- Cundeva . S. . 2008 . Computer simulation of the transient behaviour of a fluxgate magnetometric circuit . Serbian Journal of Electrical Engineering . 5 . 1 . 21–30 . 10.2298/sjee0801021c . free .