Author:
Bruckner Florian,Ducevic Amil,Heistracher Paul,Abert Claas,Suess Dieter
Abstract
AbstractWe present methods for calculating the strayfield in finite element and finite difference micromagnetic simulations using true periodic boundary conditions. In contrast to pseudo periodic boundary conditions, which are widely used in micromagnetic codes, the presented methods eliminate the shape anisotropy originating from the outer boundary. This is a crucial feature when studying the influence of the microstructure on the performance of composite materials, which is demonstrated by hysteresis calculations of soft magnetic structures that are operated in a closed magnetic loop configuration. The applied differential formulation is perfectly suited for the application of true periodic boundary conditions. The finite difference equations can be solved by a highly efficient Fast Fourier Transform method.
Publisher
Springer Science and Business Media LLC
Reference14 articles.
1. Donahue, M. J. & Porter, D. G. Oommf user's guide, version 1.0, Interagency Report NISTIR 6376, National Institute of Standard and Technology, Gaithersburg, MD (Sept 1999). http://math.nist.gov/oommf. (2010).
2. Vansteenkiste, A. et al. The design and verification of mumax3. AIP Adv. 4(10), 107133 (2014).
3. C. Abert. magnum.fd—A finite-difference/fft package for the solution of dynamical micromagnetic problems. https://github.com/micromagnetics/magnum.fd. (2013).
4. Heistracher, P., Bruckner, F., Abert, C., Vogler, C. & Suess, D. Hybrid fft algorithm for fast demagnetization field calculations on nonequidistant magnetic layers. J. Magnet. Magnet. Mater. 503, 166592 (2020).
5. M.-A. Bisotti, D. Cortés-Ortuño, R. A. Pepper, W. Wang, M. Beg, T. Kluyver, & H. Fangohr. Fidimag—A finite difference atomistic and micromagnetic simulation package. arXiv preprint arXiv:2002.04318 (2020).
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