Results 221 to 230 of about 2,040,052 (266)
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Wavelet transform associated with linear canonical Hankel transform
Mathematical methods in the applied sciences, 2019The main goal of this paper is to study about the continuous as well as discrete wavelet transform in terms of linear canonical Hankel transform (LCH‐transform) and discuss some of its basic properties.
T. Kumar, U. K. Mandal
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Localization Operators and Uncertainty Principles for the Hankel Wavelet Transform
Studia scientiarum mathematicarum Hungarica (Print), 2021The aim of this paper is to prove some uncertainty inequalities for the continuous Hankel wavelet transform, and study the localization operator associated to this transformation.
Saifallah Ghobber, Siwar Hkimi, S. Omri
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2009
Hankel transforms arise naturally in solving boundary-value problems formulated in cylindrical coordinates. They also occur in other applications such as determining the oscillations of a heavy chain suspended from one end, first treated by D. Bernoulli.
Larry C. Andrews, Bhimsen K. Shivamoggi
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Hankel transforms arise naturally in solving boundary-value problems formulated in cylindrical coordinates. They also occur in other applications such as determining the oscillations of a heavy chain suspended from one end, first treated by D. Bernoulli.
Larry C. Andrews, Bhimsen K. Shivamoggi
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On the Hankel transform for Boehmians
Integral Transforms and Special Functions, 2010In this paper, we introduce the Hankel transform as a continuous linear map from one space of Boehmian into another and study its operational properties.
Lokenath Debnath +2 more
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, 2018
In this work, the Hankel transform method was used to obtain general solutions for stress and displacement fields in semi-infinite linear elastic, isotropic soil under axisymmetric load.
Charles Chinwuba Ike
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In this work, the Hankel transform method was used to obtain general solutions for stress and displacement fields in semi-infinite linear elastic, isotropic soil under axisymmetric load.
Charles Chinwuba Ike
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Theory and operational rules for the discrete Hankel transform.
Journal of The Optical Society of America A-optics Image Science and Vision, 2015Previous definitions of a discrete Hankel transform (DHT) have focused on methods to approximate the continuous Hankel integral transform. In this paper, we propose and evaluate the theory of a DHT that is shown to arise from a discretization scheme ...
N. Baddour, U. Chouinard
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On hankel transforms of ultradistributions
Applicable Analysis, 1985On developpe une theorie des espaces de fonctions test Hμ ,ad k, Hμ bq et Hμ ,ad k bq . Ce sont des generalisations des espaces fonctions test de type Hμ. Les elements des espaces duaux sont appeles ultradistributions. On montre que la transformation de Hankel hμ pour μ≥-1/2 est une application lineaire continue pour chacun de ces espaces dans ...
R. S. Pathak, A. B. Pandey
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Int. J. Wavelets Multiresolution Inf. Process., 2020
For the Hankel–Stockwell transform, the Price uncertainty principle is proved, we define the Localization operators and we study their boundedness and compactness. We also show that these operators belong to the so-called Schatten–von Neumann class.
N. B. Hamadi, Zineb Hafirassou
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For the Hankel–Stockwell transform, the Price uncertainty principle is proved, we define the Localization operators and we study their boundedness and compactness. We also show that these operators belong to the so-called Schatten–von Neumann class.
N. B. Hamadi, Zineb Hafirassou
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Geophysical Prospecting, 1979
AbstractInspired by the linear filter method introduced by D. P. Ghosh in 1970 we have developed a general theory for numerical evaluation of integrals of the Hankel type: image Replacing the usual sine interpolating function by sinsh (x) =a· sin (ρx)/sinh (aρx), where the smoothness parameter a is chosen to be “small”, we obtain explicit series ...
H. K. Johansen, K. Sørensen
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AbstractInspired by the linear filter method introduced by D. P. Ghosh in 1970 we have developed a general theory for numerical evaluation of integrals of the Hankel type: image Replacing the usual sine interpolating function by sinsh (x) =a· sin (ρx)/sinh (aρx), where the smoothness parameter a is chosen to be “small”, we obtain explicit series ...
H. K. Johansen, K. Sørensen
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The Structure of the Algebra of Hankel Transforms and the Algebra of Hankel-Stieltjes Transforms
Canadian Journal of Mathematics, 1971Let M be the space of all bounded regular complex-valued Borel measures defined on I = [0, ∞). M is a Banach space with ‖μ‖ = ∫d|μ|(x) (μ ∈ M). (Integrals in this paper extend over all of I unless otherwise specified.) Let v be a fixed real number no smaller than and let if z ≠ 0 and , where Jv, is the Bessel function of the first kind of order v and
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