Mellin transform of log-Lipschitz functions and equivalence of \(K\)-functionals and modulus of smoothness generated by the Mellin Steklov operator
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Publication:2695237
DOI10.1007/S12215-022-00729-8OpenAlexW4214574280MaRDI QIDQ2695237
Publication date: 30 March 2023
Published in: Rendiconti del Circolo Matemàtico di Palermo. Serie II (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s12215-022-00729-8
Real- or complex-valued set functions (28A10) Entire functions of one complex variable (general theory) (30D20) Numerical methods in Fourier analysis (65T99) General integral transforms (44A05)
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- Fourier transforms of Dini-Lipschitz functions on rank 1 symmetric spaces
- Growth and integrability of Fourier transforms on Euclidean space
- Mellin analysis and its basic associated metric -- applications to sampling theory
- The foundations of fractional calculus in the Mellin transform setting with applications
- Growth properties of Fourier transforms via moduli of continuity
- Fourier transforms of Dini-Lipschitz functions
- A direct approach to the Mellin transform
- On the application of a generalized translation operator in the approximation theory
- A generalization of the Paley-Wiener theorem for Mellin transforms and metric characterization of function spaces
- An analogue of the Titchmarsh theorem for the Fourier transform on locally compact Vilenkin groups
- Some equivalence theorems with \(K\)-functionals
- Dini-Lipschitz functions for the quaternion linear canonical transform
- Octonion Fourier transform of Lipschitz real-valued functions of three variables on the octonion algebra
- Equivalence between K-functionals and modulus of smoothness on the quaternion algebra
- Wavelet transform of Dini Lipschitz functions on the quaternion algebra
- A self-contained approach to mellin transform analysis for square integrable functions; applications
- Operational Calculus and Related Topics
- Exponential-sampling method for Laplace and other dilationally invariant transforms: I. Singular-system analysis
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