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An Accurate Approximate-Analytical Technique for Solving Time-Fractional Partial Differential Equations

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dc.contributor.author Salahshour, S.
dc.contributor.author Ahmadian, A.
dc.contributor.author Ismail, F.
dc.contributor.author Baleanu, D.
dc.contributor.author Bishehniasar, M.
dc.date.accessioned 2019-12-18T12:03:33Z
dc.date.accessioned 2025-09-18T15:44:15Z
dc.date.available 2019-12-18T12:03:33Z
dc.date.available 2025-09-18T15:44:15Z
dc.date.issued 2017
dc.description Salahshour, Soheil/0000-0003-1390-3551; Ahmadian, Ali/0000-0002-0106-7050 en_US
dc.description.abstract The demand of many scientific areas for the usage of fractional partial differential equations (FPDEs) to explain their real-world systems has been broadly identified. The solutions may portray dynamical behaviors of various particles such as chemicals and cells. The desire of obtaining approximate solutions to treat these equations aims to overcome the mathematical complexity of modeling the relevant phenomena in nature. This research proposes a promising approximate-analytical scheme that is an accurate technique for solving a variety of noninteger partial differential equations (PDEs). The proposed strategy is based on approximating the derivative of fractional-order and reducing the problem to the corresponding partial differential equation (PDE). Afterwards, the approximating PDE is solved by using a separation-variables technique. The method can be simply applied to nonhomogeneous problems and is proficient to diminish the span of computational cost as well as achieving an approximate-analytical solution that is in excellent concurrence with the exact solution of the original problem. In addition and to demonstrate the efficiency of the method, it compares with two finite difference methods including a nonstandard finite difference (NSFD) method and standard finite difference (SFD) technique, which are popular in the literature for solving engineering problems. en_US
dc.identifier.citation Bishehniasar, M...et al. (2017). An Accurate Approximate-Analytical Technique for Solving Time-Fractional Partial Differential Equations, Complexity. en_US
dc.identifier.doi 10.1155/2017/8718209
dc.identifier.issn 1076-2787
dc.identifier.issn 1099-0526
dc.identifier.scopus 2-s2.0-85042236269
dc.identifier.uri https://doi.org/10.1155/2017/8718209
dc.identifier.uri https://hdl.handle.net/20.500.12416/14215
dc.language.iso en en_US
dc.publisher Wiley-hindawi en_US
dc.relation.ispartof Complexity
dc.rights info:eu-repo/semantics/openAccess en_US
dc.title An Accurate Approximate-Analytical Technique for Solving Time-Fractional Partial Differential Equations en_US
dc.title An Accurate Approximate-Analytical Technique for Solving Time-Fractional Partial Differential Equations tr_TR
dc.type Article en_US
dspace.entity.type Publication
gdc.author.id Salahshour, Soheil/0000-0003-1390-3551
gdc.author.id Ahmadian, Ali/0000-0002-0106-7050
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gdc.author.scopusid 23028598900
gdc.author.scopusid 55602202100
gdc.author.scopusid 7005489073
gdc.author.scopusid 7005872966
gdc.author.wosid Salahshour, Soheil/K-4817-2019
gdc.author.wosid Baleanu, Dumitru/B-9936-2012
gdc.author.wosid Ahmadian, Ali/N-3697-2015
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gdc.description.department Çankaya University en_US
gdc.description.departmenttemp [Bishehniasar, M.] Univ Kashan, Fac Math Sci, Dept Appl Math, Kashan, Iran; [Salahshour, S.] Islamic Azad Univ, Mobarakeh Branch, Young Researchers & Elite Club, Mobarakeh, Iran; [Ahmadian, A.; Ismail, F.] Univ Putra Malaysia, Inst Math Res INSPEM, Lab Computat Sci & Math Phys, Serdang 43400, Selangor, Malaysia; [Baleanu, D.] Cankaya Univ, Dept Math, TR-06530 Ankara, Turkey; [Baleanu, D.] Inst Space Sci, Bucharest, Romania en_US
gdc.description.endpage 12
gdc.description.publicationcategory Makale - Uluslararası Hakemli Dergi - Kurum Öğretim Elemanı en_US
gdc.description.scopusquality Q1
gdc.description.startpage 1
gdc.description.volume 2017
gdc.description.woscitationindex Science Citation Index Expanded
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gdc.oaire.keywords Finite difference
gdc.oaire.keywords Fractional Differential Equations
gdc.oaire.keywords Variety (cybernetics)
gdc.oaire.keywords Theory and Applications of Fractional Differential Equations
gdc.oaire.keywords Mathematical analysis
gdc.oaire.keywords Convergence Analysis of Iterative Methods for Nonlinear Equations
gdc.oaire.keywords Differential equation
gdc.oaire.keywords FOS: Mathematics
gdc.oaire.keywords Functional Differential Equations
gdc.oaire.keywords Anomalous Diffusion Modeling and Analysis
gdc.oaire.keywords Numerical partial differential equations
gdc.oaire.keywords Numerical Analysis
gdc.oaire.keywords Time-Fractional Diffusion Equation
gdc.oaire.keywords Applied Mathematics
gdc.oaire.keywords Mathematical optimization
gdc.oaire.keywords Statistics
gdc.oaire.keywords Fractional calculus
gdc.oaire.keywords Partial differential equation
gdc.oaire.keywords QA75.5-76.95
gdc.oaire.keywords Applied mathematics
gdc.oaire.keywords Finite difference method
gdc.oaire.keywords Partial derivative
gdc.oaire.keywords Computer science
gdc.oaire.keywords Fractional Derivatives
gdc.oaire.keywords Semilinear Differential Equations
gdc.oaire.keywords Electronic computers. Computer science
gdc.oaire.keywords Modeling and Simulation
gdc.oaire.keywords Physical Sciences
gdc.oaire.keywords Mathematics
gdc.oaire.keywords separation-variables technique
gdc.oaire.keywords finite difference methods
gdc.oaire.keywords time-fractional partial differential equations
gdc.oaire.keywords Fractional partial differential equations
gdc.oaire.keywords approximate-analytical solution
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gdc.opencitations.count 16
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gdc.scopus.citedcount 17
gdc.virtual.author Baleanu, Dumitru
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