Title :
Transient numerical solutions of nonuniform MTL equations with nonlinear loads by wavelet expansion in time or space domain
Author :
Barmada, Sami ; Raugi, Marco
Author_Institution :
Dipt. Sistemi Elettrici ed Automazione, Pisa Univ., Italy
fDate :
8/1/2000 12:00:00 AM
Abstract :
This paper deals with the numerical solution of nonuniform transmission lines (TLs) with nonlinear loads. The method presented here is based on the wavelet expansion; a weak formulation of the TL equations is obtained by expanding voltages, currents, and operators by means of wavelet functions. The TL equations are transformed into algebraic equations where the differential operator is represented by a matrix and the unknowns are the coefficients of the wavelet expansion of voltages and currents. The numerical efficiency of the method is tested analyzing uniform, nonuniform lines and nonlinear loads. The results are compared with results obtained by means of different methods
Keywords :
load (electric); transmission line theory; wavelet transforms; algebraic equations; differential operator; nonlinear loads; nonuniform MTL equations; nonuniform multiconductor transmission lines; space domain; time domain; transient numerical solutions; wavelet expansion; wavelet functions; Convolution; Differential algebraic equations; Fourier transforms; Frequency domain analysis; Nonlinear equations; Power system transients; Signal resolution; Voltage; Wavelet analysis; Wavelet domain;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
