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Applicable Analysis
An International Journal
Volume 95, 2016 - Issue 8
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Articles

Composition of pseudodifferential operators associated with fractional Hankel–Clifford integral transformations

Akhilesh PrasadDepartment of Applied Mathematics, Indian School of Mines, Dhanbad, 826004, India.Correspondence[email protected]
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Praveen KumarDepartment of Applied Mathematics, Indian School of Mines, Dhanbad, 826004, India.View further author information
Pages 1792-1807 | Received 12 Mar 2015, Accepted 13 Jul 2015, Published online: 03 Aug 2015

Citations (15)

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Akhilesh Prasad & Tanuj Kumar. (2018) A pair of linear canonical Hankel transformations and associated pseudo-differential operators. Applicable Analysis 97:15, pages 2727-2742.
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Articles from other publishers (14)

Ujjawala Singh & Tanuj Kumar. (2023) Composition of linear canonical Hankel pseudo-differential operators. Asian-European Journal of Mathematics 16:08.
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Shrish Pandey & Bhola Tiwari. The continuum Hankel-Clifford wavelet kernel’s integrability. The continuum Hankel-Clifford wavelet kernel’s integrability.
Kanailal Mahato & Durgesh Pasawan. (2022) Norm estimates for the pseudo-differential operator involving fractional Hankel-like transform on $${\mathcal {S}}$$-type spaces. Advances in Operator Theory 8:1.
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Manish Kumar & Tusharakanta Pradhan. (2022) A pair of fractional Hankel–Clifford transform on Sobolev-type spaces: theory, examples, and applications. Advances in Operator Theory 7:4.
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S. K. Verma & Akhilesh Prasad. (2022) Product of Pseudo-Differential Operators Associated with Zero Order Mehler-Fock Transform. International Journal of Applied and Computational Mathematics 8:5.
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Akhilesh Prasad, Z. A. Ansari & Pankaj Jain. (2020) Pseudo-differential operator in the framework of linear canonical transform domain. Asian-European Journal of Mathematics 14:07, pages 2150117.
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Akhilesh Prasad, Tanuj Kumar & Amit Kumar. (2020) Convolution for a pair of quadratic-phase Hankel transforms. Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A. Matemáticas 114:3.
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Akhilesh Prasad & Tanuj Kumar. (2019) A Pair of Linear Canonical Hankel Transformations of Random Order. Mediterranean Journal of Mathematics 16:6.
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Akhilesh Prasad & Manoj Kumar Singh. (2018) Composition of Pseudo-Differential Operators Associated with Jacobi Differential Operator. Proceedings of the National Academy of Sciences, India Section A: Physical Sciences 89:3, pages 509-516.
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Tanuj Kumar & Upain Kumar Mandal. (2019) Wavelet transform associated with linear canonical Hankel transform. Mathematical Methods in the Applied Sciences 42:9, pages 3167-3178.
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Tanuj Kumar & Akhilesh Prasad. (2017) Convolution with the linear canonical Hankel transformation. Boletín de la Sociedad Matemática Mexicana 25:1, pages 195-213.
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Akhilesh Prasad & Kanailal Mahato. (2017) On the Sobolev boundedness results of the product of pseudo-differential operators involving a couple of fractional Hankel transforms. Acta Mathematica Sinica, English Series 34:2, pages 221-232.
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Akhilesh Prasad & P. K. Maurya. (2016) A couple of fractional powers of Hankel-type integral transformations and pseudo-differential operators. SeMA Journal 74:2, pages 181-211.
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Akhilesh Prasad & P. K. Maurya. (2015) A couple of fractional powers of Hankel-type integral transformations of arbitrary order. Bollettino dell'Unione Matematica Italiana 9:3, pages 323-339.
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