For every couple (p;q) of strictly positive integers, the `` alternate congruo-harmonic '' series parametrized by (p;q), whose general term is (-1)^k/(pk+q), converges infra-linearly and very slowly. On the basis of a generalized continued fraction expansion of the partial rest of the series, this paper elaborates a family of algorithms which accelerate its convergence. The convergence speed of the sequences generated by these algorithms are compared. A precise asymptotic analysis is conducted, which reveals the possibility to accelerate the convergence either infra-linearly (but with an infinite diversity of possible speeds), or linearly (with a convergence rate that appears universal relatively to (p;q)), or super-linearly, by means of se...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
1980 / 1-2. szám Dinh Van Huynh: Über linear kompakte Ringe Vértesi P.: On the convergen...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
Introduction Slow convergence is a ubiquitous problem in numerical mathematics. Therefore, methods ...
AbstractIn this note we compare two recent methods of convergence acceleration for ordinary continue...
The concept of modification used for accelerating the convergence of ordinary continued fractions is...
This paper is devoted to the acceleration of the convergence of the classical Fourier series for a s...
In this note we relate two methods of convergence acceleration for ordinary continued fractions, the...
Abstract. The current paper considers the problem of recovering a function using a lim-ited number o...
In this note we relate two methods of convergence acceleration for ordinary continued fractions, the...
We discuss Levin-type sequence transformations fsng ! fs0 ng that depend linearly on the sequence el...
AbstractIn this note we relate two methods of convergence acceleration for ordinary continued fracti...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
1980 / 1-2. szám Dinh Van Huynh: Über linear kompakte Ringe Vértesi P.: On the convergen...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
Introduction Slow convergence is a ubiquitous problem in numerical mathematics. Therefore, methods ...
AbstractIn this note we compare two recent methods of convergence acceleration for ordinary continue...
The concept of modification used for accelerating the convergence of ordinary continued fractions is...
This paper is devoted to the acceleration of the convergence of the classical Fourier series for a s...
In this note we relate two methods of convergence acceleration for ordinary continued fractions, the...
Abstract. The current paper considers the problem of recovering a function using a lim-ited number o...
In this note we relate two methods of convergence acceleration for ordinary continued fractions, the...
We discuss Levin-type sequence transformations fsng ! fs0 ng that depend linearly on the sequence el...
AbstractIn this note we relate two methods of convergence acceleration for ordinary continued fracti...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
1980 / 1-2. szám Dinh Van Huynh: Über linear kompakte Ringe Vértesi P.: On the convergen...