ON THE INEQUALITY OF DIFFERENT METRICS FOR MULTIPLE FOURIER-HAAR SERIES
From MaRDI portal
Publication:5067393
DOI10.32523/2077-9879-2021-12-3-90-93zbMath1499.42038OpenAlexW4285033661MaRDI QIDQ5067393
A. N. Bashirova, E. D. Nursultanov
Publication date: 1 April 2022
Published in: Eurasian Mathematical Journal (Search for Journal in Brave)
Full work available at URL: http://mathnet.ru/eng/emj417
Spaces of measurable functions ((L^p)-spaces, Orlicz spaces, Köthe function spaces, Lorentz spaces, rearrangement invariant spaces, ideal spaces, etc.) (46E30) Function spaces arising in harmonic analysis (42B35) Fourier series and coefficients in several variables (42B05)
Related Items (1)
\(B_{p\theta}^{\varphi}([0,1;H)\) with the Haar basis]
Cites Work
- Unnamed Item
- On interpolation and embedding theorems for the spaces \(\overset\ast{\mathfrak B}^{\sigma q}_{p\tau}(\Omega)\)
- Some new Fourier multiplier results of Lizorkin and Hörmander types
- On the order of the trigonometric diameter of the anisotropic Nikol'skii-Besov class in the metric of anisotropic Lorentz spaces
- Nikol'skii's inequality for different metrics and properties of the sequence of norms of the Fourier sums of a function in the Lorentz space
- Interpolation of Besov \(B^{\sigma q}_{p\tau}\) and Lizorkin-Triebel \(F^{\sigma q}_{p\tau}\) spaces
- Interpolation theorems for anisotropic function spaces and their applications
- On a generalization of the Lizorkin theorem on Fourier multipliers
- INTERPOLATION THEOREMS FOR NONLINEAR URYSOHN INTEGRAL OPERATORS IN GENERAL MORREY-TYPE SPACES
- Marcinkiewicz-type interpolation theorem for Morrey-type spaces and its corollaries
- O'NEIL-TYPE INEQUALITIES FOR CONVOLUTIONS IN ANISOTROPIC LORENTZ SPACES
- A Lizorkin Theorem on Fourier Series Multipliers for Strong Regular Systems
- Inequalities for entire functions of finite degree and their application to the theory of differentiable functions of several variables
This page was built for publication: ON THE INEQUALITY OF DIFFERENT METRICS FOR MULTIPLE FOURIER-HAAR SERIES
