Pole Identification for The Universal Line Model Based on Trace Fitting

The universal line model (ULM) is a frequency dependent transmission-line model based on the method of characteristics in the phase domain. Although the ULM is known to produce highly accurate models for both overhead lines and underground cables, situations have been encountered where the pole identification for the propagation function fails. In this paper, we overcome the problem by basing the pole identification on trace fitting rather than mode fitting. This is achieved by introducing delayed basis functions in the vector fitting algorithm, followed by time-delay refinement and model-order reduction. In situations where the modes can be fitted without difficulty, the existing approach using modes obtained by a frequency-dependent transformation matrix remains the most accurate.

[1]  A. Semlyen,et al.  Fast and accurate switching transient calculations on transmission lines with ground return using recursive convolutions , 1975, IEEE Transactions on Power Apparatus and Systems.

[2]  A. Semlyen,et al.  Combined phase and modal domain calculation of transmission line transients based on vector fitting , 1998 .

[3]  J. Martí,et al.  Accuarte Modelling of Frequency-Dependent Transmission Lines in Electromagnetic Transient Simulations , 1982, IEEE Transactions on Power Apparatus and Systems.

[4]  L. M. Wedepohl,et al.  Frequency-dependent transformation matrices for untransposed transmission lines using Newton-Raphson method , 1996 .

[5]  T. Noda,et al.  Identification of a multiphase network equivalent for electromagnetic transient calculations using partitioned frequency response , 2005, IEEE Transactions on Power Delivery.

[6]  Taku Noda,et al.  Phase domain modeling of frequency-dependent transmission lines by means of an ARMA model , 1996 .

[7]  Reza Iravani,et al.  Order reduction of the dynamic model of a linear weakly periodic system Part I: general methodology , 2004 .

[8]  B. Gustavsen,et al.  Improving the pole relocating properties of vector fitting , 2006, 2006 IEEE Power Engineering Society General Meeting.

[9]  L. Marti,et al.  Simulation of transients in underground cables with frequency-dependent modal transformation matrices , 1988 .

[10]  A. Semlyen,et al.  Simulation of transmission line transients using vector fitting and modal decomposition , 1998 .

[11]  Jose R. Marti,et al.  Direct phase-domain modelling of frequency-dependent overhead transmission lines , 1997 .

[12]  A. Semlyen,et al.  Rational approximation of frequency domain responses by vector fitting , 1999 .

[13]  A. Semlyen,et al.  Calculation of transmission line transients using polar decomposition , 1998 .

[14]  Adam Semlyen,et al.  Direct phase-domain calculation of transmission line transients using two-sided recursions , 1995 .

[15]  J. Navarro-Pedreño Numerical Methods for Least Squares Problems , 1996 .

[16]  B. Gustavsen Interfacing Convolution Based Linear Models to an Electromagnetic Transients Program , 2007 .

[17]  B. Gustavsen,et al.  Time delay identification for transmission line modeling , 2004, Proceedings. 8th IEEE Workshop on Signal Propagation on Interconnects.

[18]  A. S. Morched,et al.  A universal model for accurate calculation of electromagnetic transients on overhead lines and underground cables , 1999 .