AbstractMagnetostatic Maxwell equations and the Landau–Lifshitz–Gilbert (LLG) equation are combined to a multiscale method, which allows to extend the problem size of traditional micromagnetic simulations. By means of magnetostatic Maxwell equations macroscopic regions can be handled in an averaged and stationary sense, whereas the LLG allows to accurately describe domain formation as well as magnetization dynamics in some microscopic subregions. The two regions are coupled by means of their strayfield and the combined system is solved by an optimized time integration scheme
This article presents two methods for the fast computation of macroscopic magnetization model called...
International audienceIn order to model ferromagnetic materials in the field of hyperfrequencies, th...
Some magnetic materials show a magnetoelectric coupling between inhomogeneous magnetization patterns...
AbstractMagnetostatic Maxwell equations and the Landau–Lifshitz–Gilbert (LLG) equation are combined ...
Various applications ranging from spintronic devices, giant magnetoresistance sensors, and magnetic ...
Extensions of the basic micromagnetic model that include effects such as spin-current interaction, d...
Simulations of magnetization dynamics in a multiscale environment enable rapid evaluation of the Lan...
We consider a multiscale strategy addressing the disparate scales in the Landau-Lifschitz equations ...
We implement on our micromagnetics simulator low-complexity parallel fast-Fourier-transform algorith...
AbstractIn this paper we propose a time–space adaptive method for micromagnetic problems with magnet...
High performance magnets play an important role in critical issues of modern life such as renewable ...
Computational micromagnetics in three dimensions is of increasing interest with the development of m...
We present our open-source Python module Commics for the study of the magnetization dynamics in ferr...
We describe the process of multiscale modelling of magnetic materials, based on atomistic models cou...
Recently, Kim & Wilkening (Convergence of a mass-lumped finite element method for the Landau-Lifshit...
This article presents two methods for the fast computation of macroscopic magnetization model called...
International audienceIn order to model ferromagnetic materials in the field of hyperfrequencies, th...
Some magnetic materials show a magnetoelectric coupling between inhomogeneous magnetization patterns...
AbstractMagnetostatic Maxwell equations and the Landau–Lifshitz–Gilbert (LLG) equation are combined ...
Various applications ranging from spintronic devices, giant magnetoresistance sensors, and magnetic ...
Extensions of the basic micromagnetic model that include effects such as spin-current interaction, d...
Simulations of magnetization dynamics in a multiscale environment enable rapid evaluation of the Lan...
We consider a multiscale strategy addressing the disparate scales in the Landau-Lifschitz equations ...
We implement on our micromagnetics simulator low-complexity parallel fast-Fourier-transform algorith...
AbstractIn this paper we propose a time–space adaptive method for micromagnetic problems with magnet...
High performance magnets play an important role in critical issues of modern life such as renewable ...
Computational micromagnetics in three dimensions is of increasing interest with the development of m...
We present our open-source Python module Commics for the study of the magnetization dynamics in ferr...
We describe the process of multiscale modelling of magnetic materials, based on atomistic models cou...
Recently, Kim & Wilkening (Convergence of a mass-lumped finite element method for the Landau-Lifshit...
This article presents two methods for the fast computation of macroscopic magnetization model called...
International audienceIn order to model ferromagnetic materials in the field of hyperfrequencies, th...
Some magnetic materials show a magnetoelectric coupling between inhomogeneous magnetization patterns...