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عنوان
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Numerical Solution of a Nonlinear Fractional Integro-Differential Equation by a Geometric Approach
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نوع پژوهش
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مقاله چاپ شده
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کلیدواژهها
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Fractional integro-differential equation, Fictitious time, Riemann–Liouville derivative, Group-preserving scheme
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چکیده
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Numerical solution of a Riemann–Liouville fractional integro-differential bound- ary value problem with a fractional nonlocal integral boundary condition is studied based on a numerical approach which preserve the geometric structure on the Lorentz Lie group. A fictitious time τ is used to transform the dependent variable y(t) into a new one u(t, τ ) := (1 + τ ) γ y(t) in an augmented space, where 0 < γ ≤ 1 is a parameter, such that under a semi-discretization method and use of a Newton-Cotes quadrature rule the original equation is converted to a system of ODEs in the space (t, τ ) and the obtained system is solved by the Group Preserving Scheme (GPS). Some illustrative examples are given to demonstrate the accuracy and implementation of the method
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پژوهشگران
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میر سجاد هاشمی (نفر سوم)، صداقت شهمراد (نفر اول)، سهیلا پاشایی (نفر دوم)
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