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Mathematical Foundations of Computational Electromagnetism
Franck Assous
, Patrick Ciarlet, Simon Labrunie
Department of Mathematics
Research output
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Book/Report
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Book
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peer-review
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Dive into the research topics of 'Mathematical Foundations of Computational Electromagnetism'. Together they form a unique fingerprint.
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Keyphrases
Absorbing Boundary Conditions
33%
Applied Mathematics
33%
Axisymmetric Geometry
33%
Bachelor
33%
Computational Electromagnetism
100%
Coupled Models
33%
Deep Treatment
33%
Dimensionally Reduced Models
33%
Eigenvalue Problem
33%
Electromagnetism
66%
Existence Results
33%
Fixed Frequency
33%
Frequency Problems
33%
Function Space
33%
Harmonic Problems
33%
Hermann Von Helmholtz
33%
Magnetohydrodynamic Equations
33%
Magnetohydrodynamics
33%
Mathematical Aspects
33%
Mathematical Foundations
100%
Maxwell's Equations
100%
Modeling Issues
33%
Plasma Physics
33%
Prismatic Geometry
33%
Quasi-static Problem
33%
Simplified Model
33%
Time Harmonics
33%
Time-dependent Problems
33%
Topological Conditions
33%
Uniqueness Results
33%
Unknown Frequencies
33%
Variational Framework
33%
Vlasov-Maxwell
33%
Vlasov-Maxwell Equations
33%
Vlasov-Poisson
33%
Vlasov-Poisson System
33%
Well-posedness
66%
Well-posedness Results
33%
Mathematics
Applied Mathematics
33%
Boundary Condition
66%
Dependent Problem
33%
Eigenvalue Problem
33%
Existence Result
33%
Function Space
33%
Maxwell's Equation
100%
Posedness
66%
Reduced Model
33%
Uniqueness Result
33%