On the square-root approximation finite volume scheme for nonlinear drift-diffusion equations

Pub Date : 2023-02-01 DOI:10.5802/crmath.421
Clément Cancès, Juliette Venel
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引用次数: 2

Abstract

We study a finite volume scheme for the approximation of the solution to convection diffusion equations with nonlinear convection and Robin boundary conditions. The scheme builds on the interpretation of such a continuous equation as the hydrodynamic limit of some simple exclusion jump process. We show that the scheme admits a unique discrete solution, that the natural bounds on the solution are preserved, and that it encodes the second principle of thermodynamics in the sense that some free energy is dissipated along time. The convergence of the scheme is then rigorously established thanks to compactness arguments. Numerical simulations are finally provided, highlighting the overall good behavior of the scheme.
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非线性漂移扩散方程的平方根近似有限体积格式
研究了具有非线性对流和Robin边界条件的对流扩散方程解的有限体积逼近格式。该方案建立在对某一简单不相容跳跃过程的水动力极限等连续方程的解释之上。我们证明了该方案允许一个唯一的离散解,该解的自然边界是保留的,并且它在一些自由能随时间耗散的意义上编码了热力学第二原理。然后,由于紧性论证,严格地建立了该方案的收敛性。最后给出了数值模拟,突出了该方案的总体良好性能。
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