具有泛函时滞的分数阶扩散波方程的数值方法

V. Pimenov, E. Tashirova
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引用次数: 0

摘要

对于一类具有非线性泛函时滞效应的分数阶扩散波方程,构造了一种隐式数值方法。该方案基于1到2阶分数阶导数的l2逼近方法、具有离散史前性质的内插和外推以及类似的Crank-Nicolson方法。利用具有遗传的差分格式的一般理论,研究了该方法的收敛阶。该方法的收敛顺序比以前已知的方法更重要,这取决于起始值的顺序。证明的要点是利用l2法的稳定性。给出了与其他格式的数值实验结果:纯隐式方法和纯显式方法,这些结果表明,总的来说,该格式的优点。
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Numerical method for fractional diffusion-wave equations with functional delay
For a fractional diffusion-wave equation with a nonlinear effect of functional delay, an implicit numerical method is constructed. The scheme is based on the L2-method of approximation of the fractional derivative of the order from 1 to 2, interpolation and extrapolation with the given properties of discrete prehistory and an analogue of the Crank-Nicolson method. The order of convergence of the method is investigated using the ideas of the general theory of difference schemes with heredity. The order of convergence of the method is more significant than in previously known methods, depending on the order of the starting values. The main point of the proof is the use of the stability of the L2-method. The results of comparing numerical experiments with other schemes are presented: a purely implicit method and a purely explicit method, these results showed, in general, the advantages of the proposed scheme.
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