电子-离子碰撞冷等离子体动力学中的精确阈值

O. Rozanova, E. Chizhonkov, Maria I. Delova
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引用次数: 8

摘要

我们考虑了一个准线性双曲方程系统,它描述了冷等离子体中允许电子-离子碰撞的平面一维非相对论性电子振荡。考虑碰撞导致出现一个类似于机械系统中干摩擦的术语,导致总能量的减少。得到了柯西问题的全局时间光滑解存在的一个判据。它允许将初始数据精确地分为两类:一类对应于全局时间平滑解,另一类导致有限时间爆炸。研究了电子碰撞频率对解的影响。结果表明,存在一个阈值,超过该阈值后,阻尼振荡的状态就被单调阻尼的状态所取代。柯西问题的全局时间光滑解对应的初始数据集随着$ \nu $的增加而扩展,然而,在任意大的值下,存在其解在有限时间内形成奇点的光滑初始数据,并且该时间随着$ \nu $趋于无穷而趋于零。通过数值算例说明了出现奇点的性质。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Exact thresholds in the dynamics of cold plasma with electron-ion collisions
We consider a quasilinear system of hyperbolic equations that describes plane one-dimensional non-relativistic oscillations of electrons in a cold plasma with allowance for electron-ion collisions. Accounting for collisions leads to the appearance of a term analogous to dry friction in a mechanical system, leading to a decrease in the total energy. We obtain a criterion for the existence of a global in time smooth solution to the Cauchy problem. It allows to accurately separate the initial data into two classes: one corresponds to a globally in time smooth solutions, and the other leads to a finite-time blowup. The influence of electron collision frequency $ \nu $ on the solution is investigated. It is shown that there is a threshold value, after exceeding which the regime of damped oscillations is replaced by the regime of monotonic damping. The set of initial data corresponding to a globally in time smooth solution of the Cauchy problem expands with increasing $ \nu $, however, at an arbitrarily large value there are smooth initial data for which the solution forms a singularity in a finite time, and this time tends to zero as $ \nu $ tends to infinity. The character of the emerging singularities is illustrated by numerical examples.
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