AbstractBy means of a variational approach we find new series representations both for well-known mathematical constants, such as π and the Catalan constant, and for mathematical functions, such as the Riemann zeta function. The series that we have found are all exponentially convergent and provide quite useful analytical approximations. With limited effort our method can be applied to obtain similar exponentially convergent series for a large class of mathematical functions
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
The appearance of Catalan numbers in certain infinite series expansions of the sine function was fir...
In this article, in a few pages, we will try to give an idea of convergence acceleration methods and...
AbstractBy means of a variational approach we find new series representations both for well-known ma...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
We prove generating function identities producing fast convergent series for the sequences beta(2n +...
This paper proposes a new method of convergence acceleration of series expansion of complex function...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series repre...
Infinite-series representations find applications in many mathematical and engineering domains. The ...
The called Riemann Zeta function was presented by Euler like the function , that is a convergent ser...
This work describes numerical methods that are useful in many areas: examples include statistical mo...
One of the most fundamental results in calculus was the discovery of the mathematical constant e = 2...
ABSTRACT. This paper sketches a technique for improving the rate of convergence of a general oscilla...
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
The appearance of Catalan numbers in certain infinite series expansions of the sine function was fir...
In this article, in a few pages, we will try to give an idea of convergence acceleration methods and...
AbstractBy means of a variational approach we find new series representations both for well-known ma...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
We prove generating function identities producing fast convergent series for the sequences beta(2n +...
This paper proposes a new method of convergence acceleration of series expansion of complex function...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series represe...
Because of their widespread utility, it is of interest, especially in applications, to analyze the s...
In this article we show the Markov-WZ Method in action as it finds rapidly converging series repre...
Infinite-series representations find applications in many mathematical and engineering domains. The ...
The called Riemann Zeta function was presented by Euler like the function , that is a convergent ser...
This work describes numerical methods that are useful in many areas: examples include statistical mo...
One of the most fundamental results in calculus was the discovery of the mathematical constant e = 2...
ABSTRACT. This paper sketches a technique for improving the rate of convergence of a general oscilla...
In this paper is examined the acceleration of convergence of alternative and non-alternative numeric...
The appearance of Catalan numbers in certain infinite series expansions of the sine function was fir...
In this article, in a few pages, we will try to give an idea of convergence acceleration methods and...