. "The paper presents a new way of numerical inversion of two-dimensional Laplace transforms (2D-NILT). The method comes out the previous works where the 2D-NILT techniques based on the FFT and epsilon-algorithm was elaborated. Here, however, quotient-difference algorithm of Rutishauser is used to accelerate the convergence of a two-dimensional complex Fourier series instead of the epsilon-algorithm. This approach leads to the improvement in the numerical stability of the method while the accuracy is approximatelly the same." . "V, Z(MSM 262200011), Z(MSM 262200022)" . "Gliwice-Ustro\u0148" . "Novel FFT-Based Method for Numerical Inversion of Two-Dimensional Laplace Transforms."@en . . . "4"^^ . . . . "Gliwice-Ustro\u0148, Poland" . "Proceedings of 25th International Conference on Fundamentals of Electrotechnics and Circuit Theory IC-SPETO 2002" . "RIV/00216305:26220/02:PU30274!RIV11-MSM-26220___" . . "[E43128DF07AC]" . . "2002-05-22+02:00"^^ . "1"^^ . . . . . "1"^^ . "26220" . "Two-dimensional Laplace transform, numerical inversion, FFT, quotient-difference algorithm, Matlab language"@en . . . "RIV/00216305:26220/02:PU30274" . "Novel FFT-Based Method for Numerical Inversion of Two-Dimensional Laplace Transforms." . . "Institute of Theoretical and Industrial Electrical Engineering of Silesian University of Technology" . "83-85940-24-3" . "656051" . . . "Novel FFT-Based Method for Numerical Inversion of Two-Dimensional Laplace Transforms."@en . . "The paper presents a new way of numerical inversion of two-dimensional Laplace transforms (2D-NILT). The method comes out the previous works where the 2D-NILT techniques based on the FFT and epsilon-algorithm was elaborated. Here, however, quotient-difference algorithm of Rutishauser is used to accelerate the convergence of a two-dimensional complex Fourier series instead of the epsilon-algorithm. This approach leads to the improvement in the numerical stability of the method while the accuracy is approximatelly the same."@en . "Bran\u010D\u00EDk, Lubom\u00EDr" . . . "Novel FFT-Based Method for Numerical Inversion of Two-Dimensional Laplace Transforms." .