Namias' fractional Fourier transforms on \(L^ 2\) and applications to differential equations
From MaRDI portal
Publication:1122735
DOI10.1016/0022-247X(88)90094-7zbMath0676.42006MaRDI QIDQ1122735
Publication date: 1988
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Related Items (15)
On a study of the representation of solutions of a \(\Psi\)-Caputo fractional differential equations with a single delay ⋮ Injectivity of sampled Gabor phase retrieval in spaces with general integrability conditions ⋮ On Laplace transforms with respect to functions and their applications to fractional differential equations ⋮ Riesz transform associated with the fractional Fourier transform and applications in image edge detection ⋮ Abelian theorems for fractional wavelet transform ⋮ The fractional Fourier transform and quadratic field magnetic resonance imaging ⋮ A fractional power theory for Hankel transform in \(L^ 2(\mathbb{R}^ +)\) ⋮ Fractional Fourier transforms on \(L^p\) and applications ⋮ Fractional continuous wavelet transform on some function spaces ⋮ Short time coupled fractional Fourier transform and the uncertainty principle ⋮ Fractional transformations of generalized functions ⋮ FRACTIONAL HADAMARD TRANSFORM WITH CONTINUOUS VARIABLES IN THE CONTEXT OF QUANTUM OPTICS ⋮ Product of continuous fractional wave packet transforms ⋮ The generalized continuous wavelet transform associated with the fractional Fourier transform ⋮ On the extension of the coupled fractional Fourier transform and its properties
Cites Work
- Unnamed Item
- Unnamed Item
- Semigroups of linear operators and applications to partial differential equations
- On one-parameter unitary groups in Hilbert space
- On one-parameter groups of linear transformations. I
- On Namias's Fractional Fourier Transforms
- The Fractional Order Fourier Transform and its Application to Quantum Mechanics
This page was built for publication: Namias' fractional Fourier transforms on \(L^ 2\) and applications to differential equations
