Abstract
A general method for the inversion of Laplace transforms which are rational functions in the variablep 1/2 is presented. The numerical aspects of the method are discussed.
Zusammenfassung
Ein allgemeines Verfahren zur Umkehrung von Laplace-Transformierten, die rationale Funktionen vonp 1/2 sind, wird angegeben. Die numerischen Aspekte dieses Verfahrens werden diskutiert.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Explore related subjects
Discover the latest articles, news and stories from top researchers in related subjects.References
Kilomeitseva, M. B., andN. V. Netushil: Transients in automatic control systems with irrational transfer functions. Automation and Remote Control26, 353–358 (1965).
Holbrook, J. G.: Laplace transforms for electronic engineers. Oxford: Pergamon Press. 1966.
Kogan, B. Y., Y. I. Petrenko, andM. K. Chernyshev: The modeling of irrational transfer functions. Automation and Remote Control29, 1117–1129 (1968).
Erdélyi, A., et al.: Tables of integral transforms, Vol. 1. New York: McGraw-Hill. 1954.
Miller, J. C. P.: Parabolic cylinder functions, in: Handbook of Mathematical Function (M. Abramowitz, andI. Stegun, eds.) New York: Dover Publ. 1965.
Christiansen, S.: Error integral with complex argument. BIT5, 287–293 (1965).
Gautschi, W.: Complex error function. Comm. ACM12, 635 (1969).
Gautschi, W.: Computational aspects of three-term recurrence relations. SIAM Rev.9, 24–82 (1967).
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Piessens, R., Haegemans, A. Inversion of some irrational Laplace transforms. Computing 11, 39–43 (1973). https://doi.org/10.1007/BF02239470
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF02239470