A 2nd-Order Numerical Scheme for Fractional Ordinary Differential Equation Systems

We propose a new numerical method for fractional ordinary differential equation systems based on a judiciously chosen quadrature point. The proposed method is efficient and easy to implement. We show that the convergence order of the method is 2. Numerical results are presented to demonstrate that the computed rates of convergence confirm our theoretical findings.

[1]  Hossein Jafari,et al.  Solving a system of nonlinear fractional differential equations using Adomian decomposition , 2006 .

[2]  N. Ford,et al.  Analysis of Fractional Differential Equations , 2002 .

[3]  Kamel Al-khaled,et al.  Numerical solutions for systems of fractional differential equations by the decomposition method , 2005, Appl. Math. Comput..

[4]  A. Kilbas,et al.  Cauchy Problem for Differential Equation with Caputo Derivative , 2004 .

[5]  Hossein Jafari,et al.  Adomian decomposition: a tool for solving a system of fractional differential equations , 2005 .

[6]  Shaher Momani,et al.  Homotopy perturbation method for nonlinear partial differential equations of fractional order , 2007 .

[7]  Shaher Momani,et al.  Numerical approach to differential equations of fractional order , 2007 .

[8]  R. Varga On diagonal dominance arguments for bounding ‖A-1‖∞ , 1976 .

[9]  V. Rehbock,et al.  A 2nd-order one-point numerical integration scheme for fractional ordinary differential equations , 2017 .

[10]  S. Momani,et al.  Solving systems of fractional differential equations using differential transform method , 2008 .

[11]  S. Momani,et al.  The homotopy analysis method for handling systems of fractional differential equations , 2010 .

[12]  S. Momani,et al.  Application of Variational Iteration Method to Nonlinear Differential Equations of Fractional Order , 2006 .

[13]  Song Wang,et al.  Numerical Solution of Fractional Optimal Control , 2018, J. Optim. Theory Appl..