The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term into two parts and then combining the second part of the n-th term with the first part of the (n+1) -th term t get a new series and leaving the first part of the first term as an "orphan". Repeating this process an infinite number of times, the series will often approach zero, and we obtain the series of orphans, which may converge faster than the original series. H euristics for determining the splits are given. Various mathematical constants, originally defined as series having a term ratio which approaches 1, are accelerated into series having a term ratio less than 1. This is done with the constants of Euler and Catalan. The se ries for p...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
AbstractIn this note we compare two recent methods of convergence acceleration for ordinary continue...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...
For every couple (p;q) of strictly positive integers, the `` alternate congruo-harmonic '' series pa...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
We prove generating function identities producing fast convergent series for the sequences beta(2n +...
AbstractBy means of a variational approach we find new series representations both for well-known ma...
Introduction Slow convergence is a ubiquitous problem in numerical mathematics. Therefore, methods ...
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
La serie de Gregory-Leibniz ${\Large \Sigma} _{j=1}^{\infty}\frac {(-1)^{j+1}}{2j-1}=\frac{\pi}{4}$,...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
We introduce a probabilistic perspective to the problem of accelerating the convergence of a wide cl...
Abstract. We express the asymptotics of the remainders of the partial sums {sn} of the generalized h...
This paper proposes a new method of convergence acceleration of series expansion of complex function...
How can one compute the sum of an infinite series s := a1 + a2 + ź ź ź ? If the series converges fas...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
AbstractIn this note we compare two recent methods of convergence acceleration for ordinary continue...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...
For every couple (p;q) of strictly positive integers, the `` alternate congruo-harmonic '' series pa...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
We prove generating function identities producing fast convergent series for the sequences beta(2n +...
AbstractBy means of a variational approach we find new series representations both for well-known ma...
Introduction Slow convergence is a ubiquitous problem in numerical mathematics. Therefore, methods ...
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
La serie de Gregory-Leibniz ${\Large \Sigma} _{j=1}^{\infty}\frac {(-1)^{j+1}}{2j-1}=\frac{\pi}{4}$,...
AbstractWe compare the epsilon algorithm of Wynn with a generalization of summation by parts for acc...
We introduce a probabilistic perspective to the problem of accelerating the convergence of a wide cl...
Abstract. We express the asymptotics of the remainders of the partial sums {sn} of the generalized h...
This paper proposes a new method of convergence acceleration of series expansion of complex function...
How can one compute the sum of an infinite series s := a1 + a2 + ź ź ź ? If the series converges fas...
AbstractThe Θ̂-algorithm is a general extrapolation procedure for accelerating the convergence of se...
AbstractIn this note we compare two recent methods of convergence acceleration for ordinary continue...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...