TY - JOUR
T1 - Solving Maxwell's equations in singular domains with a Nitsche type method
AU - Assous, F.
AU - Michaeli, M.
PY - 2011/6/1
Y1 - 2011/6/1
N2 - In this paper, we propose and analyze a method derived from a Nitsche approach for handling boundary conditions in the Maxwell equations. Several years ago, the Nitsche method was introduced to impose weakly essential boundary conditions in the scalar Laplace operator. Then, it has been worked out more generally and transferred to continuity conditions. We propose here an extension to vector div-curl problems. This allows us to solve the Maxwell equations, particularly in domains with reentrant corners, where the solution can be singular. We formulate the method for both the electric and magnetic fields and report some numerical experiments.
AB - In this paper, we propose and analyze a method derived from a Nitsche approach for handling boundary conditions in the Maxwell equations. Several years ago, the Nitsche method was introduced to impose weakly essential boundary conditions in the scalar Laplace operator. Then, it has been worked out more generally and transferred to continuity conditions. We propose here an extension to vector div-curl problems. This allows us to solve the Maxwell equations, particularly in domains with reentrant corners, where the solution can be singular. We formulate the method for both the electric and magnetic fields and report some numerical experiments.
KW - Continuous finite element methods
KW - Maxwell equations
KW - Nitsche method
KW - Singular domains
UR - http://www.scopus.com/inward/record.url?scp=79955691264&partnerID=8YFLogxK
U2 - 10.1016/j.jcp.2011.03.013
DO - 10.1016/j.jcp.2011.03.013
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AN - SCOPUS:79955691264
SN - 0021-9991
VL - 230
SP - 4922
EP - 4939
JO - Journal of Computational Physics
JF - Journal of Computational Physics
IS - 12
ER -