2023
DOI: 10.53508/ijiam.1160992
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Numerical Solution of High-Order Linear Fredholm Integro-Differential Equations by Lucas Collocation Method

Abstract: In this paper, a useful matrix approach for high-order linear Fredholm integro-differential equations with initial boundary conditions expressed as Lucas polynomials is proposed. Through the use of a matrix equation which is equivalent to a set of linear algebraic equations—the method transforms the integro differential equation. When compared to other methods that have been proposed in the literature, the numerical results from the suggested technique reveal that it is effective and promising, and error estim… Show more

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Cited by 2 publications
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“…Several authors have contributed to this area. For example, [1] employed the differential transform method, [2] used the Bernstein operational matrix approach, [3] applied the Chebyshev collocation method, [4] employed Lucas collocation method, and [5] introduced the reliable iterative method for Volterra-Fredholm IDEs. In [6], Euler polynomials with the least squares method are used to solve IDEs.…”
Section: Introductionmentioning
confidence: 99%
“…Several authors have contributed to this area. For example, [1] employed the differential transform method, [2] used the Bernstein operational matrix approach, [3] applied the Chebyshev collocation method, [4] employed Lucas collocation method, and [5] introduced the reliable iterative method for Volterra-Fredholm IDEs. In [6], Euler polynomials with the least squares method are used to solve IDEs.…”
Section: Introductionmentioning
confidence: 99%
“…Several authors have contributed to this area. For example, [1] employed the differential transform method, [2] used the Bernstein operational matrix approach, [3] applied the Chebyshev collocation method, [4] employed Lucas collocation method, and [5] introduced the reliable iterative method for Volterra-Fredholm IDEs. In [6], Euler polynomials with the least squares method are used to solve IDEs.…”
Section: Introductionmentioning
confidence: 99%