AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives the associated q-sampling formula with qn,n∈Z as sampling points
AbstractWe give interpretations for quotient Jν+1Jν of q-Bessel functions. These q-analogs are relat...
Soumis à Journal of Lie theoryLet $\q$ be the tangent space to the noncompact causal symmetric space...
AbstractThe Fourier duality is an elegant technique to obtain sampling formulas in Paley–Wiener spac...
AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives th...
AbstractIn this paper we study the q-analogue of the jα Bessel function (see (1)) which results afte...
AbstractIn this paper q-Sobolev type spaces are defined on Rq by using the q-cosine Fourier transfor...
We define q-analogues of Fourier-Bessel series, by means of complete q- orthogonal systems construc...
AbstractWe give sufficient conditions which guarantee that the finite q-Hankel transforms have only ...
This paper deals with Al-Salam fractional q-integral operator and its application to certain q-analo...
Mathematics Subject Classification: 42A38, 42C40, 33D15, 33D60This paper aims to study the q-wavelet...
AbstractIn this article we prove that the basic finite Hankel transform whose kernel is the third-ty...
We study Fourier-Bessel series on a q-linear grid, defined as expansions in complete q-orthogonal sy...
AbstractWe derive two real Paley–Wiener theorems in the setting of quantum calculus. The first uses ...
AbstractThe Whittaker–Shannon–Kotelʼnikov (WSK) sampling theorem provides a reconstruction formula f...
The standard q-Fourier Transform (qFT) of a constant diverges, which begs for a better treatment. In...
AbstractWe give interpretations for quotient Jν+1Jν of q-Bessel functions. These q-analogs are relat...
Soumis à Journal of Lie theoryLet $\q$ be the tangent space to the noncompact causal symmetric space...
AbstractThe Fourier duality is an elegant technique to obtain sampling formulas in Paley–Wiener spac...
AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives th...
AbstractIn this paper we study the q-analogue of the jα Bessel function (see (1)) which results afte...
AbstractIn this paper q-Sobolev type spaces are defined on Rq by using the q-cosine Fourier transfor...
We define q-analogues of Fourier-Bessel series, by means of complete q- orthogonal systems construc...
AbstractWe give sufficient conditions which guarantee that the finite q-Hankel transforms have only ...
This paper deals with Al-Salam fractional q-integral operator and its application to certain q-analo...
Mathematics Subject Classification: 42A38, 42C40, 33D15, 33D60This paper aims to study the q-wavelet...
AbstractIn this article we prove that the basic finite Hankel transform whose kernel is the third-ty...
We study Fourier-Bessel series on a q-linear grid, defined as expansions in complete q-orthogonal sy...
AbstractWe derive two real Paley–Wiener theorems in the setting of quantum calculus. The first uses ...
AbstractThe Whittaker–Shannon–Kotelʼnikov (WSK) sampling theorem provides a reconstruction formula f...
The standard q-Fourier Transform (qFT) of a constant diverges, which begs for a better treatment. In...
AbstractWe give interpretations for quotient Jν+1Jν of q-Bessel functions. These q-analogs are relat...
Soumis à Journal of Lie theoryLet $\q$ be the tangent space to the noncompact causal symmetric space...
AbstractThe Fourier duality is an elegant technique to obtain sampling formulas in Paley–Wiener spac...
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