TY - GEN
T1 - Using of lanscoz and arnoldi algorithms for TLM-ROM
AU - Lukashevich, Dzianis
AU - Cangellaris, Andreas
AU - Russer, Peter
PY - 2003
Y1 - 2003
N2 - The finite-difference time-domain (FDTD) method and the transmission line matrix (TLM) method allow the formulation of state-equation representations of the discretized electromagnetic field. These representations usually involve very large numbers of state variables. Reduced order modeling (ROM) of the investigated structure may yield considerable reduction of the computational effort and can be used to generate compact models of the electromagnetic system. While complexity reduction approaches based on moment matching techniques have been intensively studied in the case of FDTD, they have not yet been considered for TLM. In this paper we apply Krylov subspace methods to TLM using the basic Arnoldi and non-symmetric Lanczos algorithm. It is shown that the inherent unitarity property of the TLM operator nevertheless implies an essential difference in comparison to former implementations for FDTD or circuit analysis. Simulation results for a rectangular cavity resonator using both TLM with and without ROM and a study of the convergence of the eigenvalues are presented here. Index Terms-Transmission Line Matrix (TLM) Method, Reduced Order Modeling (ROM).
AB - The finite-difference time-domain (FDTD) method and the transmission line matrix (TLM) method allow the formulation of state-equation representations of the discretized electromagnetic field. These representations usually involve very large numbers of state variables. Reduced order modeling (ROM) of the investigated structure may yield considerable reduction of the computational effort and can be used to generate compact models of the electromagnetic system. While complexity reduction approaches based on moment matching techniques have been intensively studied in the case of FDTD, they have not yet been considered for TLM. In this paper we apply Krylov subspace methods to TLM using the basic Arnoldi and non-symmetric Lanczos algorithm. It is shown that the inherent unitarity property of the TLM operator nevertheless implies an essential difference in comparison to former implementations for FDTD or circuit analysis. Simulation results for a rectangular cavity resonator using both TLM with and without ROM and a study of the convergence of the eigenvalues are presented here. Index Terms-Transmission Line Matrix (TLM) Method, Reduced Order Modeling (ROM).
UR - http://www.scopus.com/inward/record.url?scp=84875362277&partnerID=8YFLogxK
M3 - Conference contribution
AN - SCOPUS:84875362277
SN - 8882020096
SN - 9788882020095
T3 - ICEAA 2003 - International Conference on Electromagnetics in Advanced Applications
SP - 629
EP - 632
BT - ICEAA 2003 - International Conference on Electromagnetics in Advanced Applications
T2 - 8th International Conference on Electromagnetics in Advanced Applications, ICEAA 2003
Y2 - 8 September 2003 through 12 September 2003
ER -