Logarithmic Bernstein functions for fractional Rosenau–Hyman equation with the Caputo–Hadamard derivative

IF 4.4 2区物理与天体物理 Q2 MATERIALS SCIENCE, MULTIDISCIPLINARY Results in Physics Pub Date : 2024-12-01 DOI:10.1016/j.rinp.2024.108055

M.H. Heydari , F. Heydari , O. Bavi , M. Bayram

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Abstract

In this study, the Caputo–Hadamard derivative is fittingly used to define a fractional form of the Rosenau–Hyman equation. To solve this equation, the orthonormal logarithmic Bernstein functions (BFs) are created as a suitable basis for handling this type of derivative. The primary benefit of these functions lies in the ease of computing their Hadamard fractional integral and derivative. These logarithmic functions, combined with the orthonormal Bernstein polynomials (BPs), are simultaneously employed to develop a hybrid strategy for solving the aforementioned equation. More precisely, the orthonormal logarithmic BFs are utilized to approximate the solution in the temporal domain and the orthonormal BPs are employed in the spatial domain. In addition, a matrix is extracted for the Hadamard integral of the orthonormal logarithmic BFs due to the implementation of the presented method. The effectiveness of the established scheme in finding accurate numerical solutions is evaluated through the resolution of three examples.

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带有Caputo-Hadamard导数的分数阶Rosenau-Hyman方程的对数Bernstein函数

在本研究中，Caputo-Hadamard导数被恰当地用于定义Rosenau-Hyman方程的分数形式。为了求解这一方程，建立了标准正交对数伯恩斯坦函数（BFs）作为处理这类导数的合适基。这些函数的主要优点在于易于计算它们的阿达玛分数积分和导数。这些对数函数与标准正交伯恩斯坦多项式（bp）相结合，同时用于开发解决上述方程的混合策略。更精确地说，在时域使用正交对数bp来近似解，在空域使用正交对数bp来近似解。此外，由于该方法的实现，还提取了标准正交对数bf的Hadamard积分矩阵。通过三个算例的解析，评价了所建立的格式在寻找精确数值解方面的有效性。

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来源期刊

Results in Physics MATERIALS SCIENCE, MULTIDISCIPLINARYPHYSIC-PHYSICS, MULTIDISCIPLINARY

CiteScore

8.70

自引率

9.40%

发文量

754

审稿时长

50 days

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