球面上平流-扩散-反应问题的解法:高分辨率数值实验

IF 1 4区 地球科学 Q4 METEOROLOGY & ATMOSPHERIC SCIENCES Atmosfera Pub Date : 2022-08-02 DOI:10.20937/atm.53172
Y. Skiba, Roberto Carlos Cruz Rodriguez, D. Filatov
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引用次数: 0

摘要

采用Skiba(2015)提出的隐式无条件稳定数值方法求解球面上的线性平流-扩散-反应问题和非线性扩散-反应问题。在高分辨率球面网格上进行的数值实验表明,该方法在模拟球体上的线性平流扩散过程(大气中污染的扩散)和非线性扩散过程(非线性温度波的传播、燃烧的爆炸状态和Gray-Scott模型中的化学反应)方面是有效的。该方法正确地描述了一种物质在强迫和耗散系统中的质量平衡,并在没有强迫和耗散的情况下保持了溶液的总质量和范数。
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Solution of advection-diffusion-reaction problems on a sphere: high-resolution numerical experiments
The implicit and unconditionally stable numerical method proposed in Skiba (2015) is applied for solving linear advection-diffusion-reaction problems and nonlinear diffusion-reaction problems on a sphere. Numerical experiments carried out on a high-resolution spherical mesh show the effectiveness of the method in modelling linear advection-diffusion processes on a sphere (dispersion of pollution in the atmosphere), and nonlinear diffusion processes (propagation of nonlinear temperature waves, blow-up regimes of combustion, and chemical reactions in the Gray-Scott model). The method correctly describes the mass balance of a substance in forced and dissipative systems, and conserves the total mass and norm of the solution in the absence of forcing and dissipation.
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来源期刊
Atmosfera
Atmosfera 地学-气象与大气科学
CiteScore
2.20
自引率
0.00%
发文量
46
审稿时长
6 months
期刊介绍: ATMÓSFERA seeks contributions on theoretical, basic, empirical and applied research in all the areas of atmospheric sciences, with emphasis on meteorology, climatology, aeronomy, physics, chemistry, and aerobiology. Interdisciplinary contributions are also accepted; especially those related with oceanography, hydrology, climate variability and change, ecology, forestry, glaciology, agriculture, environmental pollution, and other topics related to economy and society as they are affected by atmospheric hazards.
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