TY - CHAP
T1 - Dimensionally reduced models
T2 - Derivation and analyses
AU - Assous, Franck
AU - Ciarlet, Patrick
AU - Labrunie, Simon
N1 - Publisher Copyright:
© Springer International Publishing AG, part of Springer Nature 2018.
PY - 2018
Y1 - 2018
N2 - In this chapter, we consider some special situations in which the three-dimensional (3D) Maxwell equations can be reformulated as two-dimensional (2D) models. More precisely, the computational domain boils down to a subset of ℝ2, with respect to a suitable system of coordinates (cylindrical, spherical, cartesian). Nevertheless, the electric and magnetic fields, and other vector quantities, still belong to ℝ3. Under suitable symmetry assumptions, one gets a single set of 2D equations or, equivalently, a single 2D variational formulation. In the general case, the electromagnetic field would be the solution to an infinite set of 2D equations, or variational formulations, obtained by Fourier analysis.
AB - In this chapter, we consider some special situations in which the three-dimensional (3D) Maxwell equations can be reformulated as two-dimensional (2D) models. More precisely, the computational domain boils down to a subset of ℝ2, with respect to a suitable system of coordinates (cylindrical, spherical, cartesian). Nevertheless, the electric and magnetic fields, and other vector quantities, still belong to ℝ3. Under suitable symmetry assumptions, one gets a single set of 2D equations or, equivalently, a single 2D variational formulation. In the general case, the electromagnetic field would be the solution to an infinite set of 2D equations, or variational formulations, obtained by Fourier analysis.
UR - http://www.scopus.com/inward/record.url?scp=85058244896&partnerID=8YFLogxK
U2 - 10.1007/978-3-319-70842-3_9
DO - 10.1007/978-3-319-70842-3_9
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AN - SCOPUS:85058244896
T3 - Applied Mathematical Sciences (Switzerland)
SP - 347
EP - 392
BT - Applied Mathematical Sciences (Switzerland)
ER -