The main theme of this thesis is oriented about three objects:
The first objective is to study the basic concepts of fractional calculus and variable-order fractional differential equations.The second objective is about solving numerically the variable-order fractional differential equations using operational matrices of Bernstein polynomials.The proposed approach will transform the variable-order fractional differential equations into the product of some matrices which can be considered as a linear system of algebraic equations, after solving the resulting system the numerical solution can be obtained. The third objective is to find the numerical solution of multiterm variable-order fractional differential equations using operational matrices of Bernstein polynomials, also the proposed method will transform the multiterm variable-order fractional differential equations into the product of matrices in other words into a system of linear algebraic equations, and the numerical solution will be reached after solving the resulting system.
The Numerical Solution of Linear Variable Order Fractional Differential Equations Using Bernstein Polynomials
number:
3969
إنجليزية
College:
department:
Degree:
Supervisor:
Asst. Prof. Dr. Osama Hameed Mohammed
year:
2017