Numerical integration method for two-parameter singularly perturbed time delay parabolic problem

S. L. Cheru, G. Duressa, T. Mekonnen
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Abstract

This study presents an (ε, μ)−uniform numerical method for a two-parameter singularly perturbed time-delayed parabolic problems. The proposed approach is based on a fitted operator finite difference method. The Crank–Nicolson method is used on a uniform mesh to discretize the time variables initially. Subsequently, the resulting semi-discrete scheme is further discretized in space using Simpson's 1/3rd rule. Finally, the finite difference approximation of the first derivatives is applied. The method is unique in that it is not dependent on delay terms, asymptotic expansions, or fitted meshes. The fitting factor's value, which is used to account for abrupt changes in the solution, is calculated using the theory of singular perturbations. The developed scheme is demonstrated to be second-order accurate and uniformly convergent. The proposed method's applicability is validated by three model examples, which yielded more accurate results than some other methods found in the literature.
双参数奇异扰动时延抛物线问题的数值积分方法
本研究针对双参数奇异扰动延时抛物问题提出了一种 (ε, μ) 均匀数值方法。所提出的方法基于拟合算子有限差分法。首先在均匀网格上使用 Crank-Nicolson 方法离散时间变量。随后,利用辛普森 1/3 法则进一步离散空间半离散方案。最后,对一阶导数进行有限差分近似。该方法的独特之处在于它不依赖于延迟项、渐近展开或拟合网格。拟合因子的值是利用奇异扰动理论计算出来的,用于解释解的突然变化。实验证明,所开发的方案具有二阶精度和均匀收敛性。三个模型实例验证了所提方法的适用性,其结果比文献中的其他一些方法更为精确。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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