Home A Numerical Approach for Fractional Order Riccati Differential Equation Using B-Spline Operational Matrix
Article
Licensed
Unlicensed Requires Authentication

A Numerical Approach for Fractional Order Riccati Differential Equation Using B-Spline Operational Matrix

  • Hossein Jafari EMAIL logo , Haleh Tajadodi and Dumitru Baleanu
Published/Copyright: March 13, 2015
Become an author with De Gruyter Brill
Author Information Explore this Subject
Fractional Calculus and Applied Analysis
From the journal Fractional Calculus and Applied Analysis Volume 18 Issue 2

Abstract

In this article, we develop an effective numerical method to achieve the numerical solutions of nonlinear fractional Riccati differential equations. We found the operational matrix within the linear B-spline functions. By this technique, the given problem converts to a system of algebraic equations. This technique is used to solve fractional Riccati differential equation. The obtained results are illustrated both applicability and validity of the suggested approach.

Keywords: fractional order Riccati equations; linear Bspline function; operational matrix

References

[1] D. Baleanu, K. Diethelm, E. Scalas, J.J. Trujillo, Fractional Calculus Models and Numerical Methods. Ser. on Complexity, Nonlinearity and Chaos, World Scientific, 2012.10.1142/8180Search in Google Scholar

[2] C. de Boor, A Practical Guide to Splines. Springer-Verlag, New York, 1978.10.1007/978-1-4612-6333-3Search in Google Scholar

[3] E. Cohen, R.F. Riesenfeld, G. Elber, Geometric Modeling with Splines: An Introduction. A.K. Peters, 2001.10.1201/9781439864203Search in Google Scholar

[4] E.H. Doha, A.H. Bhrawy, S.S. Ezz-Eldien, A new Jacobi operational matrix: an application for solving fractional differential equations. Appl. Math. Mod. 36 (2012), 4931-4943.Search in Google Scholar

[5] R. Gorenflo, F. Mainardi, E. Scalas, M. Raberto, Fractional calculus and continuous-time finance. III: The diffusion limit. In: Mathematical Finance (Eds. M. Kohlmann, S. Tang), Birkh¨auser, Basel-Boston- Berlin, 2001, 171-180.Search in Google Scholar

[6] J.C. Goswami, A.K. Chan, Fundamentals of Wavelets: Theory, Algorithms, and Applications. John Wiley & Sons, 1999.Search in Google Scholar

[7] H. Jafari, A. Kadem, D. Baleanu, T. Yilmaz, Solutions Of the fractional Davey-Stewartson equations with variational iteration method. Rom. Rep. Phys. 64, No 2 (2012), 337-346.Search in Google Scholar

[8] H. Jafari, H. Tajadodi, D. Baleanu, A modified variational iteration method for solving fractional Riccati differential equation by Adomian polynomials. Frac. Calc. Appl. Anal. 16, No 1 (2013), 109-122; DOI: 10.2478/s13540-013-0008-9; http://link.springer.com/article/10.2478/s13540-013-0008-9.Search in Google Scholar

[9] H. Jafari, S.A. Yousefi, M.A. Firoozjaee, S. Momani, C.M. Khalique, Application of Legendre wavelets for solving fractional differential equations. Comput. Math. Appl. 62 (2011), 1038-1045.Search in Google Scholar

[10] A.A. Kilbas, H.M. Srivastava, J.J. Trujillo, Theory and Applications of Fractional Differential Equations. North-Holland, New York, 2006.Search in Google Scholar

[11] V.S. Kiryakova, Generalized Fractional Calculus and Applications. Longman-Wiley-CRC Press, Harlow-N. York, 1993.Search in Google Scholar

[12] M. Lakestani, M. Dehghan, S. Irandoust-Pakchin, The construction of operational matrix of fractional derivatives using B-spline functions. Commun. Nonlinear Sci. 17 (2012), 1149-1162.Search in Google Scholar

[13] P. Lancaster, L. Rodman, Algebraic Riccati Equations. Oxford University Press, Oxford, 1995. Search in Google Scholar

[14] X. Li, Numerical solution of fractional differential equations using cubic B-spline wavelet collocation method. Commun. Nonlinear Sci., 17 (2012), 3934-3946.Search in Google Scholar

[15] A. Lotfi, M. Dehghan, S.A. Yousefi, A numerical technique for solving fractional optimal control problems. Comput. Math. Appl. 62 (2011), 1055-1067.Search in Google Scholar

[16] S. Momani, N. Shawagfeh, Decomposition method for solving fractional Riccati differential equations. Appl. Math. Comput. 182, No 2 (2006), 1083-1092.Search in Google Scholar

[17] I. Podlubny, Fractional Differential Equations. Academic Press, New York, 1999.Search in Google Scholar

[18] W.T. Reid, Riccati Differential Equations. New York and London, Academic Press, 1972.Search in Google Scholar

[19] D. Rostamy, M. Alipour, H. Jafari, D. Baleanu, Solving multi-term orders fractional differential equations by operational matrices of BPs with convergence analysis. Rom. Rep. Phys. 65, No 2 (2013), 334-349.Search in Google Scholar

[20] S.G. Samko, A.A. Kilbas, O.I. Marichev, Fractional Integrals and Derivatives: Theory and Applications. Gordon and Breach, Yverdon, 1993.Search in Google Scholar

[21] S.A. Yousefi, M. Behroozifar, Operational matrices of Bernstein polynomials and their applications. Int. J. Syst. Sci. 41 (2010), 709-716. Search in Google Scholar

Received: 2014-9-5
Published Online: 2015-3-13
Published in Print: 2015-4-1

© 2015 Diogenes Co., Sofia

Articles in the same Issue

  1. Contents
  2. Fcaa Related News, Events and Books (Fcaa–Volume 18–2–2015)
  3. New Results from Old Investigation: A Note on Fractional M-Dimensional Differential Operators. The Fractional Laplacian
  4. Pollutant Reduction of a Turbocharged Diesel Engine Using a Decentralized Mimo Crone Controller
  5. Experimental Implications of Bochner-Levy-Riesz Diffusion
  6. Fractional Diffusion on Bounded Domains
  7. On a System of Fractional Differential Equations with Coupled Integral Boundary Conditions
  8. A Numerical Approach for Fractional Order Riccati Differential Equation Using B-Spline Operational Matrix
  9. Solving Fractional Delay Differential Equations: A New Approach
  10. Formal Consistency Versus Actual Convergence Rates of Difference Schemes for Fractional-Derivative Boundary Value Problems
  11. Asymptotic Stability Of Dynamic Equations With Two Fractional Terms: Continuous Versus Discrete Case
  12. Analysis of Natural and Artificial Phenomena Using Signal Processing and Fractional Calculus
  13. Fractional Approach for Estimating Sap Velocity in Trees
  14. Fractional Calculus: Quo Vadimus? (Where are we Going?)
https://doi.org/10.1515/fca-2015-0025
Keywords for this article
fractional order Riccati equations; linear Bspline function; operational matrix

Articles in the same Issue

  1. Contents
  2. Fcaa Related News, Events and Books (Fcaa–Volume 18–2–2015)
  3. New Results from Old Investigation: A Note on Fractional M-Dimensional Differential Operators. The Fractional Laplacian
  4. Pollutant Reduction of a Turbocharged Diesel Engine Using a Decentralized Mimo Crone Controller
  5. Experimental Implications of Bochner-Levy-Riesz Diffusion
  6. Fractional Diffusion on Bounded Domains
  7. On a System of Fractional Differential Equations with Coupled Integral Boundary Conditions
  8. A Numerical Approach for Fractional Order Riccati Differential Equation Using B-Spline Operational Matrix
  9. Solving Fractional Delay Differential Equations: A New Approach
  10. Formal Consistency Versus Actual Convergence Rates of Difference Schemes for Fractional-Derivative Boundary Value Problems
  11. Asymptotic Stability Of Dynamic Equations With Two Fractional Terms: Continuous Versus Discrete Case
  12. Analysis of Natural and Artificial Phenomena Using Signal Processing and Fractional Calculus
  13. Fractional Approach for Estimating Sap Velocity in Trees
  14. Fractional Calculus: Quo Vadimus? (Where are we Going?)
Sign up now to receive a 20% welcome discount
Institutional Access
How does access work?
Have an idea on how to improve our website?
Please write us.
© 2025 De Gruyter Brill
Downloaded on 16.11.2025 from https://www.degruyterbrill.com/document/doi/10.1515/fca-2015-0025/pdf?lang=en
Scroll to top button