Combining Krylov subspace methods and identification-based methods for model order reduction
暂无分享,去创建一个
[1] Daniel Boley. Krylov space methods on state-space control models , 1994 .
[2] B. Wahlberg,et al. Modelling and Identification with Rational Orthogonal Basis Functions , 2000 .
[3] B. Gustavsen,et al. Enforcing Passivity for Admittance Matrices Approximated by Rational Functions , 2001, IEEE Power Engineering Review.
[4] C. Sanathanan,et al. Transfer function synthesis as a ratio of two complex polynomials , 1963 .
[5] Yves Rolain,et al. Numerically robust transfer function modeling from noisy frequency domain data , 2005, IEEE Transactions on Automatic Control.
[6] M. Nakhla,et al. A fast algorithm and practical considerations for passive macromodeling of measured/simulated data , 2002, Electrical Performance of Electronic Packaging,.
[7] D. Deschrijver,et al. PARAMETRIC IDENTIFICATION OF FREQUENCY DOMAIN SYSTEMS USING ORTHONORMAL RATIONAL BASES , 2006 .
[8] Lawrence T. Pileggi,et al. PRIMA: passive reduced-order interconnect macromodeling algorithm , 1998, 1997 Proceedings of IEEE International Conference on Computer Aided Design (ICCAD).
[9] T. Dhaene,et al. Orthonormal Vector Fitting: A Robust Macromodeling Tool for Rational Approximation of Frequency Domain Responses , 2007, IEEE Transactions on Advanced Packaging.
[10] E. C. Levy. Complex-curve fitting , 1959, IRE Transactions on Automatic Control.
[11] Jacob K. White,et al. Generating nearly optimally compact models from Krylov-subspace based reduced-order models , 2000 .
[12] T. Dhaene,et al. Rational modeling of spectral data using orthonormal vector fitting , 2005, Proceedings. 9th IEEE Workshop on Signal Propagation on Interconnects, 2005..
[13] Rolf Schuhmann,et al. Two-step Lanczos algorithm for model order reduction , 2002 .
[14] T. Dhaene,et al. Adaptive frequency sampling algorithm for fast and accurate S-parameter modeling of general planar structures , 1995, Proceedings of 1995 IEEE MTT-S International Microwave Symposium.
[15] R. Weigel,et al. Analysis of power distribution systems on PCB level via reduced PEEC-modeling , 2004, 15th International Conference on Microwaves, Radar and Wireless Communications (IEEE Cat. No.04EX824).
[16] O. Brune. Synthesis of a finite two-terminal network whose driving-point impedance is a prescribed function of frequency , 1931 .
[17] Heeseok Lee,et al. Model-order estimation and reduction of distributed interconnects via improved vector fitting , 2005, IEEE 14th Topical Meeting on Electrical Performance of Electronic Packaging, 2005..
[18] Tom Dhaene,et al. Some Remarks on the Vector Fitting Iteration , 2006 .
[19] Mariusz Niewczas,et al. Modeling of VLSI RC parasitics based on the network reduction algorithm , 1995, IEEE Trans. Comput. Aided Des. Integr. Circuits Syst..
[20] Tom Dhaene,et al. Broadband macromodelling of passive components using orthonormal vector fitting , 2005 .
[21] J. Niehof,et al. More effective Krylov subspace construction for smaller EM-based equivalent circuit models , 2005, Proceedings. 9th IEEE Workshop on Signal Propagation on Interconnects, 2005..
[22] W. Kautz. Transient synthesis in the time domain , 1954 .
[23] Roland W. Freund,et al. Efficient linear circuit analysis by Pade´ approximation via the Lanczos process , 1994, EURO-DAC '94.
[24] A. Semlyen,et al. Rational approximation of frequency domain responses by vector fitting , 1999 .