A numerical inversion method employing orthogonal functions is tested on an idealized transmission line problem. The reasons for its shortcomings are qualitatively discussed.
Get full access to this article
View all access options for this article.
References
1.
DayS. J., ‘Developments in obtaining transient response using Fourier transforms. Pt. 1 – Gibbs phenomena and Fourier integrals,’Int. J. Elect. Engng. Educ., 3, pp. 501–506, (1965).
2.
DayS. J., ‘Pt. 2 – Use of the modified Fourier transform,’ibid, 4, pp. 31–40, (1966).
3.
DayS. J., ‘Pt. 3 – Global response,’ibid, 6, pp. 259–265, (1968).
4.
MullineuxN.ReedJ. R., ‘Pt. 4 – Survey of the theory,’ibid, 10, pp. 256–267, (1972).
5.
LanczosC., Applied Analysis, Pitman & Sons Ltd., London, (1957).
6.
ZakianV.LittlewoodR. K., ‘Numerical inversion of Laplace transforms by weighted least square approximation,’Comp. J., 16, pp. 66–68, (1972).
7.
GuilleminE. A., Theory of Linear Physical Systems, Wiley and Sons Inc., New York, (1963).
