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A 2D finite element procedure for magnetic field analysis taking into account a vector Preisach model.

Dupré, Luc R., Van Keer, Roger, Melkebeek, Jan A.A. (1997)

Mathematical Problems in Engineering

A Boundary Element Method for a Two-Dimensional Interface Problem in Electromagnetics.

S.I. Hariharan, E. Stephan (1983)

Numerische Mathematik

A boundary integral equation for Calderón's inverse conductivity problem.

Kari Astala, Lassi Päivärinta (2006)

Collectanea Mathematica

Towards a constructive method to determine an L∞-conductivity from the corresponding Dirichlet to Neumann operator, we establish a Fredholm integral equation of the second kind at the boundary of a two dimensional body. We show that this equation depends directly on the measured data and has always a unique solution. This way the geometric optics solutions for the L∞-conductivity problem can be determined in a stable manner at the boundary and outside of the body.

A combined method for computing the field of a point source in a surface waveguide.

Kirpichnikova, N.Ya., Philippov, V.B., Fadeeva, S.Yu. (2005)

Zapiski Nauchnykh Seminarov POMI

A combined method for computing the field of the point source in a waveguide. (A weakly curved layered medium).

Filippov, V.B., Kirpichnikova, N.Ya., Vlasjuk, N.G. (2004)

Journal of Mathematical Sciences (New York)

A combined method for computing the field of the point source in a waveguide (plane-layered media).

Filippov, V.B., Kirpichnikova, N.Ya., Vlasyuk, N.G. (2004)

Journal of Mathematical Sciences (New York)

A compactness result in thin-film micromagnetics and the optimality of the Néel wall

Radu Ignat, Felix Otto (2008)

Journal of the European Mathematical Society

In this paper, we study a model for the magnetization in thin ferromagnetic films. It comes as a variational problem for $S^{1}$ -valued maps $m^{'}$ (the magnetization) of two variables $x^{'}$ : $E_{ε} (m^{'}) = ε \int {| \nabla^{'} \cdot m^{'} |}^{2} d x^{'} + \frac{1}{2} \int {|| \nabla^{'} |^{- 1 / 2} \nabla^{'} \cdot m^{'}|}^{2} d x^{'}$ . We are interested in the behavior of minimizers as $ε \to 0$ . They are expected to be $S^{1}$ -valued maps $m^{'}$ of vanishing distributional divergence $\nabla^{'} \cdot m^{'} = 0$ , so that appropriate boundary conditions enforce line discontinuities. For finite $ε > 0$ , these line discontinuities are approximated by smooth transition layers, the so-called Néel walls. Néel...

A contribution to the light field theory

H. Martini (1990)

Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry

A coupled magneto-thermoelastic problem in a perfectly conducting elastic half-space with thermal relaxation.

Roy Choudhuri, S.K., Chatterjee, Gargi (1990)

International Journal of Mathematics and Mathematical Sciences

A factorization method for an inverse Neumann problem for harmonic vector fields.

Kress, R. (2003)

Georgian Mathematical Journal

A finite difference equivalent circuit approach to secondary current modelling in annular porous electrodes.

Farrell, T. W., McElwain, D. L. S., Swinkels, D. A. J. (2001)

Journal of Applied Mathematics and Decision Sciences

A finite element method for approximating the time-harmonic Maxwell equations.

Peter Monk (1992)

Numerische Mathematik

A finite element method for exterior interface problems.

MacCamy, Richard C., Marin, S.P. (1980)

International Journal of Mathematics and Mathematical Sciences

A general perturbation formula for electromagnetic fields in presence of low volume scatterers

Roland Griesmaier (2011)

ESAIM: Mathematical Modelling and Numerical Analysis

In several practically interesting applications of electromagnetic scattering theory like, e.g., scattering from small point-like objects such as buried artifacts or small inclusions in non-destructive testing, scattering from thin curve-like objects such as wires or tubes, or scattering from thin sheet-like objects such as cracks, the volume of the scatterers is small relative to the volume of the surrounding medium and with respect to the wave length of the applied electromagnetic fields. This...

A general perturbation formula for electromagnetic fields in presence of low volume scatterers

Roland Griesmaier (2011)

ESAIM: Mathematical Modelling and Numerical Analysis

A global description of solutions to nonlinear perturbations of the Wiener--Hopf integral equations.

Milojević, Petronije S. (2006)

Electronic Journal of Differential Equations (EJDE) [electronic only]

A hierarchy of hydrodynamic models for plasmas. Zero-electron-mass limits in the drift-diffusion equations

Ansgar Jüngel, Yue-Jun Peng (2000)

Annales de l'I.H.P. Analyse non linéaire

A Lie connection between Hamiltonian and Lagrangian optics.

Dragt, Alex J. (1997)

Discrete Mathematics and Theoretical Computer Science. DMTCS [electronic only]

A Matrix Approach to the Energy-Norm Bisection in Wave Motion

George Dassios (1982)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

A Maxwell-Bloch model with discrete symmetries for wave propagation in nonlinear crystals : an application to KDP

Christophe Besse, Brigitte Bidégaray-Fesquet, Antoine Bourgeade, Pierre Degond, Olivier Saut (2004)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

This article presents the derivation of a semi-classical model of electromagnetic-wave propagation in a non centro-symmetric crystal. It consists of Maxwell’s equations for the wave field coupled with a version of Bloch’s equations which takes fully into account the discrete symmetry group of the crystal. The model is specialized in the case of a KDP crystal for which information about the dipolar moments at the Bloch level can be recovered from the macroscopic dispersion properties of the material....

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