This article investigates an efficient way of evaluating sums and series, based on a result of Abel applied to associated power series
When is the average of sums of powers of integers itself a sum of the first n integers raised to a p...
This paper presents algorithmic technique for computing the summation of binomial expansions and geo...
Sums of powers of integers arise in integration and in areas of probability. Patterns within these s...
Geometric series plays a vital role in the areas of combinatorics, science, economics, and medicine....
We use four different methods involving recurrence relations for polynomials, orthogonal polynomials...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
In this paper, we give a new criterion for the algebraic independence of the values of power series....
This paper presents computing technique for the summation of binomial expansions and geometric serie...
A method for calculating the sum of a number series is considered, using the method of term-by-term ...
AbstractWe generalize Coquet′s results on the power sum of the digital sum by the use of the binomia...
We improve a result of Bennett concerning certain sequences involving sums of powers of positive in...
ABSTRACT: We Study the use of Abel summation applied to the evaluation of infinite series and infini...
This thesis deals with the problem of representation of series in closed form, mainly by the use of ...
In this report, I offer a technique for computing power sums that is: intuitive, well-motivated, gen...
• ABSTRACT: We Study the use of Abel summation applied to the evaluation of infinite series and infi...
When is the average of sums of powers of integers itself a sum of the first n integers raised to a p...
This paper presents algorithmic technique for computing the summation of binomial expansions and geo...
Sums of powers of integers arise in integration and in areas of probability. Patterns within these s...
Geometric series plays a vital role in the areas of combinatorics, science, economics, and medicine....
We use four different methods involving recurrence relations for polynomials, orthogonal polynomials...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
In this paper, we give a new criterion for the algebraic independence of the values of power series....
This paper presents computing technique for the summation of binomial expansions and geometric serie...
A method for calculating the sum of a number series is considered, using the method of term-by-term ...
AbstractWe generalize Coquet′s results on the power sum of the digital sum by the use of the binomia...
We improve a result of Bennett concerning certain sequences involving sums of powers of positive in...
ABSTRACT: We Study the use of Abel summation applied to the evaluation of infinite series and infini...
This thesis deals with the problem of representation of series in closed form, mainly by the use of ...
In this report, I offer a technique for computing power sums that is: intuitive, well-motivated, gen...
• ABSTRACT: We Study the use of Abel summation applied to the evaluation of infinite series and infi...
When is the average of sums of powers of integers itself a sum of the first n integers raised to a p...
This paper presents algorithmic technique for computing the summation of binomial expansions and geo...
Sums of powers of integers arise in integration and in areas of probability. Patterns within these s...