Trigonometric approximation of functions belonging to certain Lipschitz classes by C1⋅ T operator
DOI10.1142/S1793557114500648zbMath1318.42003OpenAlexW1979393640MaRDI QIDQ5178366
Uaday Singh, Shailesh Kumar Srivastava
Publication date: 16 March 2015
Published in: Asian-European Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793557114500648
Trigonometric approximation (42A10) Matrix methods for summability (40C05) Rate of convergence, degree of approximation (41A25) Convergence and absolute convergence of Fourier and trigonometric series (42A20) Summability and absolute summability of Fourier and trigonometric series (42A24)
Related Items (5)
Cites Work
- Trigonometric approximation of signals (functions) belonging to \(W(L^r,\xi(t))\) class by matrix \((C^1 \cdot N_p)\) operator
- Pointwise approximation of functions from \(L^p(w)_\beta\) by linear operators of their Fourier series
- On the degree of approximation of functions belonging to a Lipschitz class by Hausdorff means of its Fourier series
- Using infinite matrices to approximate functions of class Lip\((\alpha ,p)\) using trigonometric polynomials
- Approximation of functions belonging to the generalized Lipschitz class by \(C^1 \cdot N_p\) summability method of Fourier series
- A sufficient condition for \((F_1)\)-effectiveness of the \(C^1T\)-method
- Approximation of integrable functions by general linear operators of their Fourier series
- Trigonometric approximation in \(L_{p}\)-norm
- Trigonometric approximation of functions in \(L _{p}\)-norm
- Degree of approximation of a function belonging to weighted $(L_r ,\xi(t ))$ class by (C,1)(E,q) means
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