LOCAL STRONG SOLUTIONS TO THE NONHOMOGENEOUS BENARD SYSTEM WITH NONNEGATIVE DENSITY

Zhong Xin

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LOCAL STRONG SOLUTIONS TO THE NONHOMOGENEOUS BENARD SYSTEM WITH NONNEGATIVE DENSITY

机译：具有非负密度的非均匀百合系统的局部强大解决方案

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摘要

We study the Cauchy problem of the nonhomogeneous Benard system in the whole two-dimensional (2D) space, where the density is allowed to vanish initially. We prove that there exists a unique local strong solution. To compensate for the lack of integrability of the velocity in the whole space, a careful space weight is imposed on the initial density, which cannot decay too slowly in the far field.

机译：我们研究了非齐次Benard系统在整个二维空间中的Cauchy问题，其中密度最初允许为零。证明了存在唯一的局部强解。为了补偿整个空间中速度的不可积性，对初始密度施加了一个谨慎的空间权重，该初始密度在远场中不能衰减得太慢。

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来源
《The Rocky Mountain journal of mathematics》 |2020年第4期|共20页
作者
Zhong Xin;
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作者单位

Southwest Univ Sch Math &

Stat Chongqing Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
nonhomogeneous Benard system; strong solutions; Cauchy problem; nonnegative density;

机译：非均匀百合系统;强溶液;Cauchy问题;非负密度;

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LOCAL STRONG SOLUTIONS TO THE NONHOMOGENEOUS BENARD SYSTEM WITH NONNEGATIVE DENSITY

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