Abstract
The main purpose of this work is to use the Chelyshkov-collocation spectral method for the solution of multi-order fractional differential equations under the supplementary conditions. The method is based on the approximate solution in terms of Chelyshkov polynomials with unknown coefficients. The framework is using transform equations and the given conditions into the matrix equations. By merging these results, a new operational matrix of fractional-order derivatives in Caputo sense is constructed. Finally, numerical results are included to show the validity and applicability of the method and comparisons are made with existing results.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Podlubny I (1999) Fractional differential equations. Academic Press, San Diego
Samko SG, Kilbas AA, Marichev OI (1993) Fractional integrals and derivatives: theory and applications. Gordon and Breach, Yverdon
Diethelm K (2010) The analysis of fractional differential equations. Lectures notes in mathematics. Springer, Berlin
Torvik PJ, Bagley RL (1984) On the appearance of the fractional derivative in the behavior of real materials. Trans ASME J Appl Mech 51(2):294–298
Doha EH, Bhrawy AH, Ezz-Eldien SS (2011) A Chebyshev spectral method based on operational matrix for initial and boundary value problems of fractional order. Comput Math Appl 62:2364–2373
El-Sayed AMA, El-Kalla IL, Ziada EAA (2010) Analytical and numerical solutions of multi-term nonlinear fractional orders differential equations. Appl Numer Math 60:788–797
Esmaeili S, Shamsi M (2011) A pseudo-spectral scheme for the approximate solution of a family of fractional differential equations. Commun Nonlinear Sci Numer Simulat 16:3646–3654
Lakestani M, Dehghan M, Irandoust-pakchin S (2012) The construction of operational matrix of fractional derivatives using B-spline functions. Commun Nonlinear Sci Numer Simulat 17:1149–1162
Saadatmandi A, Dehghan M (2010) A new operational matrix for solving fractional order differential equations. Comput Math Appl 59:1326–1336
Saadatmandi A (2014) Bernstein operational matrix of fractional derivatives and its applications. Appl Math Model 38(4):1365–1372
Yildirim A, Kelleci A (2010) Homotopy perturbation method for numerical solutions of coupled Burgers equations with time and space fractional derivatives. Int J Numer Methods Heat Fluid Flow 20:897–909
Chelyshkov VS (2006) Alternative orthogonal polynomials and quadratures. ETNA (Electron. Trans. Numer. Anal.) 25:17–26
Ahmadi Shali J, Darania P, Akbarfam AA (2012) Collocation method for nonlinear Volterra-Fredholm integral equations. J Appl Sci 2:115–121
Rasty M, Hadizadeh M (2010) A Product integration approach on new orthogonal polynomials for nonlinear weakly singular integral equations. Acta Appl Math 109:861–873
Soori Z, Aminataei A (2012) The spectral method for solving Sine–Gordon equation using a new orthogonal polynomial. Appl Math 2012:1–12
Oguza C, Sezer M (2015) Chelyshkov collocation method for a class of mixed functional integro-differential equations. Appl Math Comput 259:943–954
Chen Y, Yi M, Yu Ch (2012) Error analysis for numerical solution of fractional differential equation by Haar wavelets method. J Comput Sci 3:367–373
Bagley RL, Calico RA (1991) Fractional-order state equations for the control of viscoelastic damped structures. J Guid Control Dyn 14(2):304–311
Yousefi S, Behroozifar M (2010) Operational matrices of Bernstein polynomials and their applications. Int J Syst Sci 41(6):709–16
Bhrawy AH, Alofi AS, Ezz-Eldien SS (2011) A quadrature tau method for fractional differentials equations with variable coefficients. Appl Math Lett 24:2146–2152
Jafari H, Yousefi SA (2011) Application of Legendre wavelets for solving fractional differential equations. Comput Math Appl 62(3):1038–1045
Canuto C, Hussaini M, Quarteroni A, Zang T (1988) Spectral methods in fluid dynamics. Springer, Berlin
Author information
Authors and Affiliations
Corresponding author
Ethics declarations
Conflict of interest
No conflict of interest was declared by the authors.
Rights and permissions
About this article
Cite this article
Talaei, Y., Asgari, M. An operational matrix based on Chelyshkov polynomials for solving multi-order fractional differential equations. Neural Comput & Applic 30, 1369–1376 (2018). https://doi.org/10.1007/s00521-017-3118-1
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00521-017-3118-1