Generalized Yee methods extend Yee's finite-difference scheme to de Rham finite elements while preserving symplecticity under sparse mass-matrix approximations and enabling symplectic particle-in-cell coupling.
Differential Forms, Galerkin Duality, and Sparse Inverse Approxi- mations in Finite Element Solutions of Maxwell Equations
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Generalized Yee methods: Scalable symplectic finite element Maxwell solvers
Generalized Yee methods extend Yee's finite-difference scheme to de Rham finite elements while preserving symplecticity under sparse mass-matrix approximations and enabling symplectic particle-in-cell coupling.