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One Dimensional Fractional Frequency Fourier Transform by Inverse Difference Operator

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dc.contributor.author Alqurashi, Maysaa
dc.contributor.author Murugesan, Meganathan
dc.contributor.author Gnanaprakasam, Britto Antony Xavier
dc.contributor.author Baleanu, Dumitru
dc.date.accessioned 2019-12-27T12:17:04Z
dc.date.accessioned 2025-09-18T14:09:59Z
dc.date.available 2019-12-27T12:17:04Z
dc.date.available 2025-09-18T14:09:59Z
dc.date.issued 2019
dc.description M, Meganathan/0000-0002-8807-6450 en_US
dc.description.abstract This article aims to develop fractional order convolution theory to bring forth innovative methods for generating fractional Fourier transforms by having recourse to solutions for fractional difference equations. It is evident that fractional difference operators are used to formulate for finding the solutions of problems of distinct physical phenomena. While executing the fractional Fourier transforms, a new technique describing the mechanism of interaction between fractional difference equations and fractional differential equations will be introduced as h tends to zero. Moreover, by employing the theory of discrete fractional Fourier transform of fractional calculus, the modeling techniques will be improved, which would help to construct advanced equipments based on fractional transforms technology using fractional Fourier decomposition method. Numerical examples with graphs are verified and generated by MATLAB. en_US
dc.identifier.citation Baleanu, Dumitru...et al. (2019). "One dimensional fractional frequency Fourier transform by inverse difference operator", Advances in Difference Equations. en_US
dc.identifier.doi 10.1186/s13662-019-2071-y
dc.identifier.issn 1687-1847
dc.identifier.scopus 2-s2.0-85066476519
dc.identifier.uri https://doi.org/10.1186/s13662-019-2071-y
dc.identifier.uri https://hdl.handle.net/20.500.12416/13548
dc.language.iso en en_US
dc.publisher Springer en_US
dc.relation.ispartof Advances in Difference Equations
dc.rights info:eu-repo/semantics/openAccess en_US
dc.subject Inverse Difference Operator And Trigonometric Function en_US
dc.subject Fractional Fourier Transform en_US
dc.subject Polynomial Factorials en_US
dc.subject Exponential Function en_US
dc.subject Convolution Product en_US
dc.title One Dimensional Fractional Frequency Fourier Transform by Inverse Difference Operator en_US
dc.title One dimensional fractional frequency Fourier transform by inverse difference operator tr_TR
dc.type Article en_US
dspace.entity.type Publication
gdc.author.id M, Meganathan/0000-0002-8807-6450
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gdc.author.wosid M, Meganathan/Aao-4993-2021
gdc.author.wosid Baleanu, Dumitru/B-9936-2012
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gdc.coar.access open access
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gdc.description.department Çankaya University en_US
gdc.description.departmenttemp [Baleanu, Dumitru] Cankaya Univ, Dept Math, Ankara, Turkey; [Baleanu, Dumitru] Inst Space Sci, Magurele, Romania; [Alqurashi, Maysaa] King Saud Univ, Coll Sci, Math Dept, Riyadh, Saudi Arabia; [Murugesan, Meganathan; Gnanaprakasam, Britto Antony Xavier] Sacred Heart Coll Autonomous, Dept Math, Tiruppattur, Tamil Nadu, India en_US
gdc.description.publicationcategory Makale - Uluslararası Hakemli Dergi - Kurum Öğretim Elemanı en_US
gdc.description.volume 2019
gdc.description.woscitationindex Science Citation Index Expanded
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gdc.oaire.keywords Artificial neural network
gdc.oaire.keywords Polynomial factorials
gdc.oaire.keywords Mathematical analysis
gdc.oaire.keywords Inverse difference operator and Trigonometric function
gdc.oaire.keywords Convolution (computer science)
gdc.oaire.keywords Machine learning
gdc.oaire.keywords QA1-939
gdc.oaire.keywords FOS: Mathematics
gdc.oaire.keywords Convolution product
gdc.oaire.keywords Discrete Fourier transform (general)
gdc.oaire.keywords Anomalous Diffusion Modeling and Analysis
gdc.oaire.keywords Convolution theorem
gdc.oaire.keywords Applied Mathematics
gdc.oaire.keywords Exponential function
gdc.oaire.keywords Fractional Fourier Transform Analysis
gdc.oaire.keywords Fractional calculus
gdc.oaire.keywords Statistical and Nonlinear Physics
gdc.oaire.keywords Partial differential equation
gdc.oaire.keywords Applied mathematics
gdc.oaire.keywords Computer science
gdc.oaire.keywords Fourier analysis
gdc.oaire.keywords Fractional Fourier transform
gdc.oaire.keywords Fractional Derivatives
gdc.oaire.keywords Physics and Astronomy
gdc.oaire.keywords Modeling and Simulation
gdc.oaire.keywords Physical Sciences
gdc.oaire.keywords Fourier transform
gdc.oaire.keywords Fractional Calculus
gdc.oaire.keywords Mathematics
gdc.oaire.keywords Rogue Waves in Nonlinear Systems
gdc.oaire.keywords inverse difference operator
gdc.oaire.keywords Difference equations, scaling (\(q\)-differences)
gdc.oaire.keywords exponential function
gdc.oaire.keywords Fractional ordinary differential equations
gdc.oaire.keywords polynomial factorials
gdc.oaire.keywords trigonometric function
gdc.oaire.keywords Convolution as an integral transform
gdc.oaire.keywords Fractional derivatives and integrals
gdc.oaire.keywords Difference operators
gdc.oaire.keywords Convolution, factorization for one variable harmonic analysis
gdc.oaire.keywords fractional Fourier transform
gdc.oaire.keywords convolution product
gdc.oaire.keywords Discrete version of topics in analysis
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gdc.publishedmonth 5
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gdc.virtual.author Baleanu, Dumitru
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