离散化
数学
分数阶微积分
数学分析
色散(光学)
简并能级
边界层
单调多边形
边值问题
应用数学
几何学
机械
物理
量子力学
光学
作者
Miglena N. Koleva,Lubin G. Vulkov
出处
期刊:Mathematics
[Multidisciplinary Digital Publishing Institute]
日期:2023-04-25
卷期号:11 (9): 2040-2040
被引量:3
摘要
In this study, a numerical solution for degenerate space–time fractional advection–dispersion equations is proposed to simulate atmospheric dispersion in vertically inhomogeneous planetary boundary layers. The fractional derivative exists in a Caputo sense. We establish the maximum principle and a priori estimates for the solutions. Then, we construct a positivity-preserving finite-difference scheme, using monotone discretization in space and L1 approximation on the non-uniform mesh for the time derivative. We use appropriate grading techniques for the time–space mesh in order to overcome the boundary degeneration and weak singularity of the solution at the initial time. The computational results are demonstrated on the Gaussian fractional model as well on the boundary layers defined by height-dependent wind flow and diffusitivity, especially for the Monin–Obukhov model.
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