Rene Cabrera , Maria Pia Gualdani , Nestor Guillen
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引用次数: 0
摘要
朗道-库仑方程是等离子体物理学中的一个重要模型,同时具有非线性扩散和反应项。在本手稿中,我们放弃了潜在的有害反应项,将重点放在方程中的扩散算子上。我们的研究表明,朗道-库仑方程中的扩散算子比其线性对应的拉普拉斯算子具有更强的 L1→L∞ 正则化率。这一结果得益于 Gressman、Krieger 和 Strain 的非线性函数不等式以及 De Giorgi 迭代。这种更强的正则化率说明了扩散的非线性性质在朗道方程分析中的重要性,并提出了确定朗道-库仑方程本身是否也会出现这种正则化率的问题。
Regularization estimates of the Landau–Coulomb diffusion
The Landau–Coulomb equation is an important model in plasma physics featuring both nonlinear diffusion and reaction terms. In this manuscript we focus on the diffusion operator within the equation by dropping the potentially nefarious reaction term altogether. We show that the diffusion operator in the Landau–Coulomb equation provides a much stronger rate of regularization than its linear counterpart, the Laplace operator. The result is made possible by a nonlinear functional inequality of Gressman, Krieger, and Strain together with a De Giorgi iteration. This stronger regularization rate illustrates the importance of the nonlinear nature of the diffusion in the analysis of the Landau equation and raises the question of determining whether this rate also happens for the Landau–Coulomb equation itself.
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