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3D-2D Asymptotic Analysis for Micromagnetic Thin Films

Published online by Cambridge University Press:  15 August 2002

Roberto Alicandro
Affiliation:
SISSA, Via Beirut 4, 34013 Trieste, Italy; [email protected].
Chiara Leone
Affiliation:
Dipartimento di Matematica, Università di Roma I, P.le A. Moro 2, 00185 Roma, Italy; [email protected].
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Abstract

Γ-convergence techniques and relaxation results of constrained energy functionals are used to identify the limiting energy as the thickness ε approaches zero of a ferromagnetic thin structure $\Omega_\varepsilon=\omega\times(-\varepsilon,\varepsilon)$, $\omega\subset\mathbb R^2$, whose energy is given by $$ {\cal E}_{\varepsilon}({\overline{m}})=\frac{1}{\varepsilon} \int_{\Omega_{\varepsilon}}\left(W({\overline{m}},\nabla{\overline{m}}) +{\frac{1}{2}}\nabla {\overline{u}}\cdot {\overline{m}}\right)\,{\rm d}x $$ subject to $$ \hbox{div}(-\nabla {\overline{u}}+{\overline{m}}\chi_{\Omega_\varepsilon})=0 \quad\hbox{ on }\mathbb R^3, $$ and to the constraint $$ |\overline{m}|=1 \hbox{ on }\Omega_\varepsilon, $$ where W is any continuous function satisfying p-growth assumptions with p> 1. Partial results are also obtained in the case p=1, under an additional assumption on W.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 2001

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References

A. Braides and A. Defranceschi, Homogenization of Multiple Integrals. Oxford University Press, Oxford (1998).
A. Braides and I. Fonseca, Brittle thin films, Preprint CNA-CMU. Pittsburgh (1999).
A. Braides, I. Fonseca and G. Francfort, 3D-2D asymptotic analysis for inhomogeneous thin films, Preprint CNA-CMU. Pittsburgh (1999).
W.F. Brown, Micromagnetics. John Wiley and Sons, New York (1963).
C. Castaing and M. Valadier, Convex analysis and measurable multifunctions. Springer-Verlag, New York, Lecture Notes in Math. 580 (1977).
B. Dacorogna, Direct methods in Calculus of Variations. Springer-Verlag, Berlin (1989).
Dacorogna, B., Fonseca, I., Maly, J. and Trivisa, K., Manifold constrained variational problems. Calc. Var. 9 (1999) 185-206. CrossRef
G. Dal Maso, An Introduction to Γ-convergence. Birkhäuser, Boston (1993).
Fonseca, I. and Francfort, G., 3D-2D asymptotic analysis of an optimal design problem for thin films. J. Reine Angew. Math. 505 (1998) 173-202.
I. Fonseca and G. Francfort, On the inadequacy of the scaling of linear elasticity for 3D-2D asymptotic in a nonlinear setting, Preprint CNA-CMU. Pittsburgh (1999).
Fonseca, I. and Müller, S., Quasi-convex integrands and lower semicontinuity in L 1. SIAM J. Math. Anal. 23 (1992) 1081-1098. CrossRef
Gioia, G. and James, R.D., Micromagnetics of very thin films. Proc. Roy. Soc. Lond. Ser. A 453 (1997) 213-223. CrossRef
Morrey, C.B., Quasiconvexity and the semicontinuity of multiple integrals. Pacific J. Math. 2 (1952) 25-53. CrossRef
C.B. Morrey, Multiple integrals in the Calculus of Variations. Springer-Verlag, Berlin (1966).