A novel numerical approach for the third order Emden–Fowler type equations

Mehmet Giyas Sakar, Onur Saldır, Fatih Aydın, M. Yasin Rece
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Abstract

This article aims to achieve robust numerical results by applying the Chebyshev reproducing kernel method without homogenizing the initial‐boundary conditions of the Emden–Fowler (E‐F) equation, thereby introducing a new perspective to the literature. A novel numerical approach is presented for solving the initial‐boundary value problem of third‐order E‐F equations using Chebyshev reproducing kernel theory. Unlike previous applications, which were confined to homogeneous initial‐boundary value problems or required homogenization, the proposed method is effective for both homogeneous and nonhomogeneous cases. To handle the initial‐boundary conditions of the E‐F equations, additional basis functions are introduced rather than imposing conditions on the reproducing kernel Hilbert space. The method's effectiveness is demonstrated through five examples, which validate the theoretical analysis. Overall, the results emphasize the method's efficiency.
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三阶埃姆登-福勒方程的新型数值方法
本文旨在通过应用切比雪夫重现核方法,在不对埃姆登-福勒(E-F)方程的初界条件进行同质化的情况下获得稳健的数值结果,从而为文献引入了一个新的视角。本文提出了一种利用切比雪夫重现核理论求解三阶 E-F 方程初界值问题的新颖数值方法。以往的应用仅限于均质初界值问题或需要均质化,而本文提出的方法则不同,对均质和非均质情况均有效。为了处理 E-F 方程的初始边界条件,我们引入了额外的基函数,而不是对重现核希尔伯特空间施加条件。该方法通过五个实例验证了理论分析的有效性。总体而言,结果凸显了该方法的高效性。
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