Calculus of Variations and Geometric Measure Theory

G. Di Fratta - A. Jüngel - D. Praetorius - V. Slastikov

Spin-diffusion model for micromagnetics in the limit of long times

created by difratta on 30 Apr 2021
modified on 14 Jun 2023

[BibTeX]

Published Paper

Inserted: 30 apr 2021
Last Updated: 14 jun 2023

Journal: Journal of Differential Equations
Year: 2020

ArXiv: 2009.14534 PDF

Abstract:

In this paper, we consider spin-diffusion Landau-Lifshitz-Gilbert equations (SDLLG), which consist of the time-dependent Landau-Lifshitz-Gilbert (LLG) equation coupled with a time-dependent diffusion equation for the electron spin accumulation. The model takes into account the diffusion process of the spin accumulation in the magnetization dynamics of ferromagnetic multilayers. We prove that in the limit of long times, the system reduces to simpler equations in which the LLG equation is coupled to a nonlinear and nonlocal steady-state equation, referred to as SLLG. As a by-product, the existence of global weak solutions to the SLLG equation is obtained. Moreover, we prove weak-strong uniqueness of solutions of SLLG, i.e., all weak solutions coincide with the (unique) strong solution as long as the latter exists in time. The results provide a solid mathematical ground to the qualitative behavior originally predicted by Zhang, Levy, and Fert in Physical Review Letters 88 (2002) in ferromagnetic multilayers.