Algebraic inversion of the Laplace transform

P. G. Massouros; G. M. Genin

doi:10.1016/j.camwa.2004.11.017

Algebraic inversion of the Laplace transform

P. G. Massouros, G. M. Genin

Research output: Contribution to journal › Article › peer-review

6 Scopus citations

Abstract

A new algebraic scheme for inverting Laplace transforms of smooth functions is presented. Expansion of the Laplace transform F(s) in descending powers of s is used to construct the Taylor series of the corresponding time function f(t). This is done through entirely algebraic evaluations of F(s) at symmetric points around circles in the complex plane. Test functions are used to examine the method and the results show good convergence over a broad region near t = 0. The method is especially well-suited to computer-based inversion of Laplace transform.

Original language	English
Pages (from-to)	179-185
Number of pages	7
Journal	Computers and Mathematics with Applications
Volume	50
Issue number	1-2
DOIs	https://doi.org/10.1016/j.camwa.2004.11.017
State	Published - Jul 2005

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title = "Algebraic inversion of the Laplace transform",

abstract = "A new algebraic scheme for inverting Laplace transforms of smooth functions is presented. Expansion of the Laplace transform F(s) in descending powers of s is used to construct the Taylor series of the corresponding time function f(t). This is done through entirely algebraic evaluations of F(s) at symmetric points around circles in the complex plane. Test functions are used to examine the method and the results show good convergence over a broad region near t = 0. The method is especially well-suited to computer-based inversion of Laplace transform.",

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AB - A new algebraic scheme for inverting Laplace transforms of smooth functions is presented. Expansion of the Laplace transform F(s) in descending powers of s is used to construct the Taylor series of the corresponding time function f(t). This is done through entirely algebraic evaluations of F(s) at symmetric points around circles in the complex plane. Test functions are used to examine the method and the results show good convergence over a broad region near t = 0. The method is especially well-suited to computer-based inversion of Laplace transform.

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JO - Computers and Mathematics with Applications

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ER -

Algebraic inversion of the Laplace transform

Abstract

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