This paper deals with certain generalization of the alternating harmonic series ? the generalized convergent harmonic series with periodically repeated numerators (a,b) and (a,a,b,b). Firstly, we ?nd out the value of the numerators bofthe?rstseries, forwhichtheseriesconverges, anddetermine the formula for the sum s(a) of this series. Then we determine the value of the numerators b of the second series, for which this series converges, and derive the formula for the sum s(a,a) of this second series. Finally, we verify these analytically obtained results and compute the sums of these series by using the computer algebra system Maple 16 and its basic programming language
AbstractTwo open problems recently proposed by Xi and Luo (Adv. Differ. Equ. 2021:38, 2021) are reso...
AbstractLet Sn denote the nth partial sum of the harmonic series. An asymptotic approximation for Sn...
AbstractA useful recursive formula for obtaining the infinite sums of even order harmonic series Σ∞n...
This paper introduces a generalization of the alternating harmonic series, expresses the sum in two ...
We consider what value the harmonic series will converge to if evaluated in the obvious way using s...
The harmonic series diverges. But if we delete from the harmonic series all terms whose denominators...
AbstractAfter having recalled some important results about combinatorics on words, like the existenc...
We consider series of the form $p/q + \sum_{j=2}^\infty 1/x_j$, where $x_1=q$ and the integer sequen...
AbstractIn this paper we consider five conjectured harmonic number identities similar to those arisi...
AbstractFor positive integersa,b,cwitha⩾2, letA(a, b, c) denote the triple harmonic series[formula]W...
AbstractWe investigate a one-parameter family of infinite generalised continued fractions. The fract...
The paper deals with the reduced harmonic series generated by four primes. A formula for the sum of ...
A historical development of the harmonic series subseries that are convergent is made. It is well kn...
AbstractThe classical hypergeometric summation theorems are exploited to derive several striking ide...
This contribution is a follow-up to author’s papers [1], [2], [3], [4], [5], [6], [7], and in partic...
AbstractTwo open problems recently proposed by Xi and Luo (Adv. Differ. Equ. 2021:38, 2021) are reso...
AbstractLet Sn denote the nth partial sum of the harmonic series. An asymptotic approximation for Sn...
AbstractA useful recursive formula for obtaining the infinite sums of even order harmonic series Σ∞n...
This paper introduces a generalization of the alternating harmonic series, expresses the sum in two ...
We consider what value the harmonic series will converge to if evaluated in the obvious way using s...
The harmonic series diverges. But if we delete from the harmonic series all terms whose denominators...
AbstractAfter having recalled some important results about combinatorics on words, like the existenc...
We consider series of the form $p/q + \sum_{j=2}^\infty 1/x_j$, where $x_1=q$ and the integer sequen...
AbstractIn this paper we consider five conjectured harmonic number identities similar to those arisi...
AbstractFor positive integersa,b,cwitha⩾2, letA(a, b, c) denote the triple harmonic series[formula]W...
AbstractWe investigate a one-parameter family of infinite generalised continued fractions. The fract...
The paper deals with the reduced harmonic series generated by four primes. A formula for the sum of ...
A historical development of the harmonic series subseries that are convergent is made. It is well kn...
AbstractThe classical hypergeometric summation theorems are exploited to derive several striking ide...
This contribution is a follow-up to author’s papers [1], [2], [3], [4], [5], [6], [7], and in partic...
AbstractTwo open problems recently proposed by Xi and Luo (Adv. Differ. Equ. 2021:38, 2021) are reso...
AbstractLet Sn denote the nth partial sum of the harmonic series. An asymptotic approximation for Sn...
AbstractA useful recursive formula for obtaining the infinite sums of even order harmonic series Σ∞n...