Asymptotic shape of isolated magnetic domains

Abstract

We investigate the energy of an isolated magnetized domain ⊂ Rn for n=2,3. In non-dimensionalized variables, the energy given by E() \ = \ ∫Rn |∇ | \ dx + ∫Rn |∇ h|2 \ dx penalizes the interfacial area of the domain as well as the energy of the corresponding magnetostatic field. Here, the magnetostatic potential h is determined by h = ∂1 , corresponding to uniform magnetization within the domain. We consider the macroscopic regime || → ∞, in which we derive compactness and -limit which is formulated in terms of the cross-sectional area of the anisotropically rescaled configuration. We then give the solutions for the limit problems.