Abstract. In 1914, Kempner proved that the series consisting of the inverses of natural numbers which are free of the digit 9 is convergent. In 1916, Irwin considered the convergence problem of the series containing the inverses of all numbers that contain a group of digits a number of times. These types of series are still under the attention of many mathematicians such as R. Baillie, T. Schmelzer, H. Behforooz, B. Farhi, etc. In this paper we will deal with the problem of computing the sum of series of Kempner-Irwin type. 2000 Mathematics Subject Classification. Primary 65B10; Secondary 11-04. Key words and phrases. Kempner series, Irwin series, summation of slowly convergent series
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The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
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AbstractThe convergence of the Neumann-type series to {1,2}-inverses has been shown by K. Tanabe [Li...
WOS: 000444547000021A sequence ( sn) of real numbers is said to be summable to a finite number. by t...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...
A historical development of the harmonic series subseries that are convergent is made. It is well kn...
The harmonic series diverges. But if we delete from the harmonic series all terms whose denominators...
AbstractThe purpose of this work is to introduce new types of sequences, whose terms are infinite se...
Dedicated to Olav Nj̊astad on the occasion of his 70th birthday The function in question is H(x) = k...
This paper deals with the convergence of the summation of power series of the form Σa ≤ k ≤ bf(k)xk...
Accompanied by "Supplement to Professor Lorgna's Summation of series. To which are added, remarks on...
We construct two adjacent sequences that converge to the sum of a given convergent pseries. In case ...
AbstractThis paper deals with the convergence of the summation of power series of the form Σα≤κ(κ)χκ...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
This book presents results about certain summability methods, such as the Abel method, the Norlund m...
Using a corollary to Karamata's main theorem [Math. Z. 32 (1930), 319-320], we prove that if a slowl...
A standard procedure in numerical treatment of a slowly convergent series is to transform it into a ...
AbstractThe convergence of the Neumann-type series to {1,2}-inverses has been shown by K. Tanabe [Li...
WOS: 000444547000021A sequence ( sn) of real numbers is said to be summable to a finite number. by t...
The rate of convergence of infinite series can be accelerated b y a suitable splitting of each term ...