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A product theorem for the Euler and the Natarajan methods of summability
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Pinnangudi Narayanasubramanian Natarajan
Published/Copyright:
June 1, 2013
Abstract
In this paper, entries of infinite matrices and sequences are real or complex numbers. The main purpose of this paper is to prove a product theorem involving the Euler method (E, r) and the Natarajan method (M, λn).
Published Online: 2013-06
Published in Print: 2013-06
© by Oldenbourg Wissenschaftsverlag, München, Germany
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Articles in the same Issue
- Optimal initial value conditions for local strong solutions of the Navier–Stokes equations in exterior domains
- Hypergeometric summation representations of the Stieltjes constants
- Meromorphic functions whose certain differential polynomials share a small function with finite weight
- Convolutions of slanted half-plane harmonic mappings
- Meromorphic functions that share one small function DM with their first derivative
- A product theorem for the Euler and the Natarajan methods of summability
- Hermite–Hadamard type integral inequalities for geometric-arithmetically s-convex functions
Keywords for this article
Regular summability methods;
(M, λn)method;
(E, r) method;
product theorem;
consistency
Articles in the same Issue
- Optimal initial value conditions for local strong solutions of the Navier–Stokes equations in exterior domains
- Hypergeometric summation representations of the Stieltjes constants
- Meromorphic functions whose certain differential polynomials share a small function with finite weight
- Convolutions of slanted half-plane harmonic mappings
- Meromorphic functions that share one small function DM with their first derivative
- A product theorem for the Euler and the Natarajan methods of summability
- Hermite–Hadamard type integral inequalities for geometric-arithmetically s-convex functions
