AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for accelerating slowly convergent Fourier series. The series considered are ∑nn−p cos nθ(sin nθ), ∑nJo(ny)cos nθ(sin nθ) and four series that arise from the numerical inversion Summation by parts is shown to be advantageous in the acceleration of Fourier sine series. Both acceleration techniques are shown to lead to approximately the same accuracy in accelerating the series that come from the Laplace transform examples
AbstractA new algorithm is presented for accelerating the convergence of sequences possessing an asy...
The purpose of this thesis is to investigate certain properties of the epsilon algorithm (also calle...
This work describes numerical methods that are useful in many areas: examples include statistical mo...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
AbstractThe Fourier series of a smooth function on a compact interval usually has slow convergence d...
We discuss Levin-type sequence transformations fsng ! fs0 ng that depend linearly on the sequence el...
AbstractThe sequence of Gaver functionals is useful in the numerical inversion of Laplace transforms...
A comparative study of acceleration methods for computing the infinite series summation arising in p...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
AbstractQuite often in application, logarithmically convergent series have to be evaluated. There ar...
Introduction Slow convergence is a ubiquitous problem in numerical mathematics. Therefore, methods ...
AbstractThe well-known correspondence of a power series with a certain Stieltjes integral is exploit...
Abstract. Regular matrix methods that improve and accelerate the convergence of sequences and series...
AbstractIt has been known since long that an oversampled function can be represented by a generalize...
AbstractA new algorithm is presented for accelerating the convergence of sequences possessing an asy...
The purpose of this thesis is to investigate certain properties of the epsilon algorithm (also calle...
This work describes numerical methods that are useful in many areas: examples include statistical mo...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
AbstractThe Fourier series of a smooth function on a compact interval usually has slow convergence d...
We discuss Levin-type sequence transformations fsng ! fs0 ng that depend linearly on the sequence el...
AbstractThe sequence of Gaver functionals is useful in the numerical inversion of Laplace transforms...
A comparative study of acceleration methods for computing the infinite series summation arising in p...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
AbstractQuite often in application, logarithmically convergent series have to be evaluated. There ar...
Introduction Slow convergence is a ubiquitous problem in numerical mathematics. Therefore, methods ...
AbstractThe well-known correspondence of a power series with a certain Stieltjes integral is exploit...
Abstract. Regular matrix methods that improve and accelerate the convergence of sequences and series...
AbstractIt has been known since long that an oversampled function can be represented by a generalize...
AbstractA new algorithm is presented for accelerating the convergence of sequences possessing an asy...
The purpose of this thesis is to investigate certain properties of the epsilon algorithm (also calle...
This work describes numerical methods that are useful in many areas: examples include statistical mo...