Open AccessNumerical Solution of Fractional-Order Fredholm Integrodifferential Equation in the Sense of Atangana–Baleanu Derivative
Author(s) -
Jian Wang,
Kamran Kamran,
Ayesha Jamal,
Xuemei Li
Publication year - 2021
Publication title -
mathematical problems in engineering
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.262
H-Index - 62
eISSN - 1026-7077
pISSN - 1024-123X
DOI - 10.1155/2021/6662808
Subject(s) - mathematics , laplace transform , fredholm integral equation , mathematical analysis , integral equation , inverse laplace transform , fractional calculus , laplace's equation , inverse , order (exchange) , algebraic equation , fredholm theory , nonlinear system , partial differential equation , geometry , physics , finance , quantum mechanics , economics
In the present article, our aim is to approximate the solution of Fredholm-type integrodifferential equation with Atangana–Baleanu fractional derivative in Caputo sense. For this, we propose a method based on Laplace transform and inverse LT. In our numerical scheme, the given equation is transformed to an algebraic equation by employing the Laplace transform. The reduced equation will be solved in complex plane. Finally, the solution of the given problem is obtained via inverse Laplace transform by representing it as a contour integral. Then, the trapezoidal rule is used to approximate the integral to high accuracy. We have considered linear and nonlinear fractional Fredholm integrodifferential equations to validate our method.
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