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
It is contained the new proof of Paley-Wiener type theorem for the Bessel transform in this pape
We develop the nth order Fourier-Bessel series expansion of 1-D functions in the interval (0,α). Hen...
Abstract. We make a brief survey of orthogonal polynomials which are not included in the Askey schem...
AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives th...
AbstractAfter the analysis of the q-even translation and the q-cosine Fourier transform by A. Fitouh...
AbstractWe derive two real Paley–Wiener theorems in the setting of quantum calculus. The first uses ...
We use the Paley–Wiener theorem for the Fourier and Hankel transforms to compare Fourier and Hankel ...
Abstract. Let q be the tangent space to the noncompact causal symmetric space SU(n, n)/SL(n,C) × R∗...
In this paper a Calderón-type reproducing formula for q-Bessel convolution is estab-lished using th...
[[abstract]]In this paper, a modied q-Mellin transform is introduced and stud- ied, and a Plancherel...
<p>In this article, we give a new harmonic analysis associated with the generalized q-Bessel operato...
Abstract: A qversion of the sampling theorem is derived using the qHankel transform introduced by Ko...
AbstractWe study fractional transforms associated with q-Bessel operator which is useful to inverse ...
AbstractSeveral q-analogues of certain integral transforms have been recently investigated by many a...
AbstractThe purpose of this paper is to establish an analogue of Cowling–Price theorem for the Besse...
It is contained the new proof of Paley-Wiener type theorem for the Bessel transform in this pape
We develop the nth order Fourier-Bessel series expansion of 1-D functions in the interval (0,α). Hen...
Abstract. We make a brief survey of orthogonal polynomials which are not included in the Askey schem...
AbstractThis paper establishes a Paley–Wiener theorem related to the q-Bessel transform and gives th...
AbstractAfter the analysis of the q-even translation and the q-cosine Fourier transform by A. Fitouh...
AbstractWe derive two real Paley–Wiener theorems in the setting of quantum calculus. The first uses ...
We use the Paley–Wiener theorem for the Fourier and Hankel transforms to compare Fourier and Hankel ...
Abstract. Let q be the tangent space to the noncompact causal symmetric space SU(n, n)/SL(n,C) × R∗...
In this paper a Calderón-type reproducing formula for q-Bessel convolution is estab-lished using th...
[[abstract]]In this paper, a modied q-Mellin transform is introduced and stud- ied, and a Plancherel...
<p>In this article, we give a new harmonic analysis associated with the generalized q-Bessel operato...
Abstract: A qversion of the sampling theorem is derived using the qHankel transform introduced by Ko...
AbstractWe study fractional transforms associated with q-Bessel operator which is useful to inverse ...
AbstractSeveral q-analogues of certain integral transforms have been recently investigated by many a...
AbstractThe purpose of this paper is to establish an analogue of Cowling–Price theorem for the Besse...
It is contained the new proof of Paley-Wiener type theorem for the Bessel transform in this pape
We develop the nth order Fourier-Bessel series expansion of 1-D functions in the interval (0,α). Hen...
Abstract. We make a brief survey of orthogonal polynomials which are not included in the Askey schem...
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