k-Hankel two-wavelet theory and localization operators

Time-frequency analysis associated with the deformed Stockwell transform ⋮ Quantitative uncertainty principles associated with the \(k\)-generalized Stockwell transform ⋮ \(k\)-Hankel Wigner transform and its applications to the localization operators theory ⋮ The localization operator and wavelet multipliers involving the Watson transform ⋮ 2D and 3D image localization, compression and reconstruction using new hybrid moments ⋮ Linear canonical deformed Hankel transform and the associated uncertainty principles ⋮ A new class of uncertainty principles for the \(k\)-Hankel wavelet transform ⋮ Localization operators and scalogram associated with the deformed Hankel wavelet transform ⋮ New uncertainty principles for the $(k,a)$-generalized wavelet transform ⋮ Time-frequency analysis of (k,a)-generalized wavelet transform and applications ⋮ Localization operators associated with the windowed Opdam–Cherednik transform on modulation spaces ⋮ Quantitative uncertainty principles associated with the k$$ k $$‐Hankel wavelet transform on ℝd$$ {\mathbb{R}}^d $$ ⋮ Generalized translation operator and uncertainty principles associated with the deformed Stockwell transform ⋮ Generalized convolution operator associated with the \((k, a)\)-generalized Fourier transform on the real line and applications ⋮ Harmonic analysis problems associated with the \(k\)-Hankel Gabor transform ⋮ \(k\)-Hankel Gabor transform and its applications to the theory of localization operators ⋮ Besov-type spaces for the \(\kappa\)-Hankel wavelet transform on the real line ⋮ Unnamed Item ⋮ \(k\)-Hankel Gabor transform on \(\mathbb{R}^d\) and its applications to the reproducing kernel theory ⋮ Time-frequency analysis associated with the \(k\)-Hankel Gabor transform on \(\mathbb{R}^d\)

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• Nonlinear generalized Dunkl-wave equations and applications
• Explicit formulas for the Dunkl dihedral kernel and the \((\kappa,a)\)-generalized Fourier kernel
• Wavelet transforms and localization operators
• Non-Abelian harmonic analysis. Applications of \(SL(2,{\mathbb{R}})\)
• Time-frequency analysis of localization operators.
• Foundations of time-frequency analysis
• Spectral theorems associated with the \((k,a)\)-generalized wavelet multipliers
• A product formula and a convolution structure for a \(k\)-Hankel transform on \(\mathbb{R}\)
• Two-wavelet localization operators on \(L^p(\mathbb{R}^n)\) for the Weyl-Heisenberg group
• Strichartz estimates for Schrödinger-Laguerre operators
• The Clifford-Fourier transform
• Weighted inequalities and uncertainty principles for the (k,a)-generalized Fourier transform
• Dunkl operators and a family of realizations of $\mathfrak{osp}(1\vert2)$
• The kernel of the radially deformed Fourier transform
• On the Clifford-Fourier Transform
• Laguerre semigroup and Dunkl operators
• UNIFORM EIGENVALUE ESTIMATES FOR TIME-FREQUENCY LOCALIZATION OPERATORS
• The $\mathfrak {su}(2)_\alpha $ Hahn oscillator and a discrete Fourier–Hahn transform
• HILBERT–SCHMIDT OPERATORS AND FRAMES — CLASSIFICATION, BEST APPROXIMATION BY MULTIPLIERS AND ALGORITHMS
• Decomposition of Hardy Functions into Square Integrable Wavelets of Constant Shape
• Differential-Difference Operators Associated to Reflection Groups
• Time-frequency localization operators: a geometric phase space approach
• Calcul symbolique et propagation des singularités pour les équations aux dérivées partielles non linéaires
• 𝐿^{𝑝} boundedness of localization operators associated to left regular representations
• Pitt's Inequalities and Uncertainty Principle for Generalized Fourier Transform
• Clifford algebras, Fourier transforms, and quantum mechanics
• Intermediate spaces and interpolation, the complex method