AbstractThe notation ∑k∣nf(k) means the finite sum of all numbers f(k) as k ranges over the integers that divide n including 1 and n. The purpose of this paper is to define a theory of summability suggested by this type of sum and an associated theory of convergence. This paper studies five sequence spaces that are related to the arithmetical summability thus defined
By (A, B), we denote the set of all sequences epsilon such that Sigma epsilon(n)x(n) is summable by ...
AbstractBy (A,B), we denote the set of all sequences ϵ such that Σϵnxn is summable by B whenever Σxn...
Some recent results on a general summability method, on the so-called θ-summability is summarized. N...
AbstractThe notation ∑k∣nf(k) means the finite sum of all numbers f(k) as k ranges over the integers...
The theory of summability has many uses throughout analysis and applied mathematics. Engineers and p...
This book develops the foundations of "summability calculus", which is a comprehensive theory of fra...
By (A, B) we denote the set of all sequences lambda = (lambda(n)) such that Sigma a(n) lambda(n) is ...
AbstractBy (A, B) we denote the set of all sequences λ = (λn) such that Σanλn is summable B, wheneve...
Mazhar (1971) gave the characterization for the series ∑anϵn to be summable |N,pn| whenever ∑an is s...
Abstract – The object of this paper is to establish a summability factor theorem for summabilit
AbstractBy (A, B) we denote the set of all sequences λ = (λn) such that Σanλn is summable B, wheneve...
This book presents results about certain summability methods, such as the Abel method, the Norlund m...
By (A, B) we denote the set of all sequences λ = (λn) such that Σanλn is summable B, whenever Σan is...
AbstractIn this paper we deal with the convergence of the sequence τ^n(x)=(x1+…+xn)/τn for a given s...
By (A, B), we denote the set of all sequences epsilon such that Sigma epsilon(n)x(n) is summable by ...
By (A, B), we denote the set of all sequences epsilon such that Sigma epsilon(n)x(n) is summable by ...
AbstractBy (A,B), we denote the set of all sequences ϵ such that Σϵnxn is summable by B whenever Σxn...
Some recent results on a general summability method, on the so-called θ-summability is summarized. N...
AbstractThe notation ∑k∣nf(k) means the finite sum of all numbers f(k) as k ranges over the integers...
The theory of summability has many uses throughout analysis and applied mathematics. Engineers and p...
This book develops the foundations of "summability calculus", which is a comprehensive theory of fra...
By (A, B) we denote the set of all sequences lambda = (lambda(n)) such that Sigma a(n) lambda(n) is ...
AbstractBy (A, B) we denote the set of all sequences λ = (λn) such that Σanλn is summable B, wheneve...
Mazhar (1971) gave the characterization for the series ∑anϵn to be summable |N,pn| whenever ∑an is s...
Abstract – The object of this paper is to establish a summability factor theorem for summabilit
AbstractBy (A, B) we denote the set of all sequences λ = (λn) such that Σanλn is summable B, wheneve...
This book presents results about certain summability methods, such as the Abel method, the Norlund m...
By (A, B) we denote the set of all sequences λ = (λn) such that Σanλn is summable B, whenever Σan is...
AbstractIn this paper we deal with the convergence of the sequence τ^n(x)=(x1+…+xn)/τn for a given s...
By (A, B), we denote the set of all sequences epsilon such that Sigma epsilon(n)x(n) is summable by ...
By (A, B), we denote the set of all sequences epsilon such that Sigma epsilon(n)x(n) is summable by ...
AbstractBy (A,B), we denote the set of all sequences ϵ such that Σϵnxn is summable by B whenever Σxn...
Some recent results on a general summability method, on the so-called θ-summability is summarized. N...
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