Two New Convolutions for the Fractional Fourier Transform

Anh, Pham Ky; Castro, L. P.; Thao, P. T.; Tuan, Nguyen Minh

doi:10.1007/s11277-016-3567-3

Cited by 22 publications

(27 citation statements)

References 30 publications

(53 reference statements)

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“…In what follows, the notation (F )(x) of the Fourier series will be replaced by  (x) given by (1). Furthermore, the representation in the form (5) naturally suggests that we define a finite Fourier-type transformation as follows.…”

Section: Proposition 1 the Set Of Functionsmentioning

confidence: 99%

“…Introducing new convolutions has a direct impact in the areas of integral equations and operator theory, and different convolutions are as much important as many properties and applications they will be able to exhibit. [1][2][3][4][5] Although the study of convolutions can also be seen as a classical subarea of mathematical analysis, the reason why it continues to attract the interest of several researchers is due to its high potential in exhibiting new properties and concrete applications. In fact, such convolutions can be seen as integral transforms that we can study from a theoretical point of view.…”

Section: Introductionmentioning

confidence: 99%

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New convolutions and their applicability to integral equations of Wiener‐Hopf plus Hankel type

Castro

Guerra

Tuan³

2020

Math Meth Appl Sci

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We propose four new convolutions exhibiting convenient factorization properties associated with two finite interval integral transformations of Fourier‐type together with their norm inequalities. Moreover, we study the solvability of a class of integral equations of Wiener‐Hopf plus Hankel type (on finite intervals) with the help of the factorization identities of such convolutions. Fourier‐type series are used to produce the solution formula of such equations, and a Shannon‐type sampling formula is also obtained.

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Section: Proposition 1 the Set Of Functionsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

New convolutions and their applicability to integral equations of Wiener‐Hopf plus Hankel type

Castro

Guerra

Tuan³

2020

Math Meth Appl Sci

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“…In [3], we have introduced two new convolutions for the FRFT. Namely, one of such convolutions was defined by…”

Section: Introductionmentioning

confidence: 99%

New sampling theorem and multiplicative filtering in the FRFT domain

Anh

Castro

Thao

et al. 2019

SIViP

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Having in consideration a fractional convolution associated with the fractional Fourier transform (FRFT), we propose a novel reconstruction formula for bandlimited signals in the FRFT domain without using the classical Shannon theorem. This may be considered the main contribution of this work, and numerical experiments are implemented to demonstrate the effectiveness of the proposed sampling theorem. As a second goal, we also look for the designing of multiplicative filters. Indeed, we also convert the multiplicative filtering in FRFT domain to the time domain, which can be realized by Fast Fourier transform. Two concrete examples are included where the use of the present results is illustrated.

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“…For other convolutions and integral operators, while not being exhaustive, we refer the reader to [1,2,3,8,12,13,14,15,16,17,18,22,25,26,28]. In addition, it is relevant to have in mind that the factorization property of convolutions is crucial in solving corresponding convolution type equations [6,7,11,25].…”

Section: Introductionmentioning

confidence: 99%

New Convolutions for Quadratic-Phase Fourier Integral Operators and their Applications

2018

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We obtain new convolutions for quadratic-phase Fourier integral operators (which include, as subcases, e.g., the fractional Fourier transform and the linear canonical transform). The structure of these convolutions is based on properties of the mentioned integral operators and takes profit of weight-functions associated with some amplitude and Gaussian functions. Therefore, the fundamental properties of that quadraticphase Fourier integral operators are also studied (including a Riemann-Lebesgue type lemma, invertibility results, a Plancherel type theorem and a Parseval type identity).As applications, we obtain new Young type inequalities, the asymptotic behaviour of some oscillatory integrals, and the solvability of convolution integral equations.

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Two New Convolutions for the Fractional Fourier Transform

Cited by 22 publications

References 30 publications

New convolutions and their applicability to integral equations of Wiener‐Hopf plus Hankel type

New convolutions and their applicability to integral equations of Wiener‐Hopf plus Hankel type

New sampling theorem and multiplicative filtering in the FRFT domain

New Convolutions for Quadratic-Phase Fourier Integral Operators and their Applications

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