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Iterative method with high-order accuracy for solving a fourth-order nonlinear boundary value problem for Kirchhoff-type equations

Năm XB 2024 Tạp chí / Hội thảo Lecture Notes in Networks and Systems Volume 1205 LNNS Đơn vị CNTT DOI / Link https://doi.org/10.1007/978-3-031-80943-9_43 ↗

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Tài liệu tham khảo

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[4] Ma, T.F.: Existence results and numerical solutions for a beam equation with nonlinear boundary conditions. Appl. Numer. Math. 47, 189–196 (2003)

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[7] Quang, V.V., Dung, N.D.: An algorithm approximates the higher order derivative with high accuracy. TNU J. Sci. Tech. 229, 22–30 (2024). https://doi.org/10.34238/tnu-jst.9516 (2024)

[8] Sidi, A., Pennline, J.: Improving the accuracy of quadrature method solutions of Fredholm integral equations that arise from nonlinear two-point boundary value problems. J. Integral Eq. Appl. 11, 103–139 (1999)

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