The Gaver-Stehfest algorithm for numerical inversion of Laplace transform was developed in the late 1960s. Due to its simplicity and good performance it is becoming increasingly more popular in such diverse areas as Geophysics, Operations Research and Economics, Financial and Actuarial Mathematics, Computational Physics and Chemistry. Despite the large number of applications and numerical studies, this method has never been rigorously investigated. In particular, it is not known whether the Gaver-Stehfest approximations converge and what is the rate of convergence. In this paper we answer the first of these two questions: We prove that the Gaver-Stehfest approximations converge for functions of bounded variation and functions satisfying an ...
An explanation is given of the convergence behaviour of the IDR(s) methods. The convergence of the I...
Approximation theory studies the process of approaching arbitrary functions by simple func-tions dep...
We use Stein’s method to obtain explicit bounds on the rate of convergence for the Laplace approxima...
Abstract. The Gaver–Stehfest algorithm for numerical inversion of Laplace transform was de-veloped i...
AbstractThe sequence of Gaver functionals is useful in the numerical inversion of Laplace transforms...
The Stehfest-Gaver method of inverting Laplace transforms is a very useful tool in approximating non...
The Laplace transform inversion is a well-known ill-conditioned problem and many numerical schemes i...
The Laplace transform inversion is a well-known ill-conditioned problem and many numerical schemes i...
This paper presents an analysis in terms of their accuracy of selected numerical methods for the inv...
This paper studies new inversion methods for the Laplace transform of vector-valued functions arisin...
For the numerical inversion of Laplace transforms we suggest to use multi-precision computing with t...
AbstractA direct generalization of a convergence acceleration algorithm due to the author to infinit...
Centro de Informacion y Documentacion Cientifica (CINDOC). C/Joaquin Costa, 22. 28002 Madrid. SPAIN ...
An explanation is given of the convergence behaviour of the IDR(s) methods. The convergence of the I...
We are concerned with Gaver’s formula, which is at the heart of a numerical algorithm, widely used i...
An explanation is given of the convergence behaviour of the IDR(s) methods. The convergence of the I...
Approximation theory studies the process of approaching arbitrary functions by simple func-tions dep...
We use Stein’s method to obtain explicit bounds on the rate of convergence for the Laplace approxima...
Abstract. The Gaver–Stehfest algorithm for numerical inversion of Laplace transform was de-veloped i...
AbstractThe sequence of Gaver functionals is useful in the numerical inversion of Laplace transforms...
The Stehfest-Gaver method of inverting Laplace transforms is a very useful tool in approximating non...
The Laplace transform inversion is a well-known ill-conditioned problem and many numerical schemes i...
The Laplace transform inversion is a well-known ill-conditioned problem and many numerical schemes i...
This paper presents an analysis in terms of their accuracy of selected numerical methods for the inv...
This paper studies new inversion methods for the Laplace transform of vector-valued functions arisin...
For the numerical inversion of Laplace transforms we suggest to use multi-precision computing with t...
AbstractA direct generalization of a convergence acceleration algorithm due to the author to infinit...
Centro de Informacion y Documentacion Cientifica (CINDOC). C/Joaquin Costa, 22. 28002 Madrid. SPAIN ...
An explanation is given of the convergence behaviour of the IDR(s) methods. The convergence of the I...
We are concerned with Gaver’s formula, which is at the heart of a numerical algorithm, widely used i...
An explanation is given of the convergence behaviour of the IDR(s) methods. The convergence of the I...
Approximation theory studies the process of approaching arbitrary functions by simple func-tions dep...
We use Stein’s method to obtain explicit bounds on the rate of convergence for the Laplace approxima...