@article{oai:muroran-it.repo.nii.ac.jp:00010407,
 author = {MORIMOTO, Keita and 森本, 佳太 and IGUCHI, Akito and 井口, 亜希人 and TSUJI,  Yasuhide and 辻, 寧英},
 issue = {4},
 journal = {IEEE PHOTONICS JOURNAL},
 month = {},
 note = {application/pdf, A new efficient boundary condition of finite element method (FEM) by using propagation operator is proposed. In this method, input, and output ports are terminated on their own boundaries instead of using perfectly matched layer (PML) which requires expanding the computational window. Moreover, this boundary condition can consider all modes including radiation modes without mode expansion. The propagation operator is efficiently calculated by Denman-Beavers iteration (DBI). The electromagnetic field on the POM boundary can be accurately propagated outside the boundary by using the propagation operator. In addition, we present a technique based on scattering operator method which can reduce the computational complexity of FEM. Three numerical results show that the present scheme is more accurate, and stable than conventional approximate boundary conditions such as using Pade approximation in both TE, and TM modes.},
 title = {Propagation Operator Based Boundary Condition for Finite Element Analysis},
 volume = {12},
 year = {2020},
 yomi = {モリモト, ケイタ and イグチ, アキト and ツジ, ヤスヒデ}
}