On absolute Riesz summability factors of infinite series and their application to Fourier series
-
Hüseyin Bor
Abstract
In this paper, some known results on the absolute Riesz summability factors of infinite series and trigonometric Fourier series have been generalized for the
Acknowledgements
The author would like to thank the referee for valuable suggestions for the improvement of the paper.
References
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Articles in the same Issue
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- (σ,τ)-*-Jordan ideals in *-prime rings
- Ruled surfaces generated by elliptic cylindrical curves in the isotropic space
- On the convergence of difference schemes for the generalized BBM–Burgers equation
- A sharp boundedness result for restricted maximal operators of Vilenkin–Fourier series on martingale Hardy spaces
- On absolute Riesz summability factors of infinite series and their application to Fourier series
- A new set of Sheffer–Bell polynomials and logarithmic numbers
- FS-coalgebras and crossed coproducts
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- Some applications of degenerate poly-Bernoulli numbers and polynomials
- On multivalued stochastic integral equations driven by semimartingales
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Articles in the same Issue
- Frontmatter
- (σ,τ)-*-Jordan ideals in *-prime rings
- Ruled surfaces generated by elliptic cylindrical curves in the isotropic space
- On the convergence of difference schemes for the generalized BBM–Burgers equation
- A sharp boundedness result for restricted maximal operators of Vilenkin–Fourier series on martingale Hardy spaces
- On absolute Riesz summability factors of infinite series and their application to Fourier series
- A new set of Sheffer–Bell polynomials and logarithmic numbers
- FS-coalgebras and crossed coproducts
- On duality for a second-order multiobjective fractional programming problem involving type-I functions
- Hardy’s inequality on Hardy–Morrey spaces
- Some applications of degenerate poly-Bernoulli numbers and polynomials
- On multivalued stochastic integral equations driven by semimartingales
- Group-groupoid actions and liftings of crossed modules
- New subclasses of analytic functions defined by convolution involving the hypergeometric function and the Owa–Srivastava operator
- On groups with action on itself
-
Some results for complex partial q-difference equations in
