Brezis-Merle inequalities and application to the global existence of the cauchy problem of the Keller-Segel system

Nagai T.; Ogawa T.

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Brezis-Merle inequalities and application to the global existence of the cauchy problem of the Keller-Segel system

机译：Brezis-Merle不等式及其在Keller-Segel系统柯西问题的全球存在中的应用

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We discuss the existence of the global solution for two types of nonlinear parabolic systems called the Keller-Segel equation and attractive drift-diffusion equation in two space dimensions. We show that the system admits a unique global solution in L~∞_(loc)(0, ∞ L ~∞(?~2)). The proof is based upon the BrezisMerle type inequalities of the elliptic and parabolic equations. The proof can be applied to the Cauchy problem which is describing the self-interacting system.

机译：我们讨论了在两个空间维度上两种类型的非线性抛物方程组的整体解的存在，即Keller-Segel方程和有吸引力的漂移扩散方程。我们证明系统在L〜∞_（loc）（0，∞L〜∞（？〜2））中接受唯一的全局解。该证明基于椭圆和抛物线方程的BrezisMerle型不等式。该证明可以应用于描述自相互作用系统的柯西问题。

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《Communications in contemporary mathematics》 |2011年第5期|共18页
作者
Nagai T.; Ogawa T.;
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正文语种 eng
中图分类数学;
关键词
Brezis-Merle inequalities; global solutions; Keller-Segel system;

机译：Brezis-Merle不等式;整体解;Keller-Segel系统;

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专利

1. Brezis-Merle inequalities and application to the global existence of the cauchy problem of the Keller-Segel system [J] . Nagai T., Ogawa T. Communications in contemporary mathematics . 2011,第5期

机译：Brezis-Merle不等式及其在Keller-Segel系统柯西问题的全球存在中的应用
2. BREZIS–MERLE INEQUALITIES AND APPLICATION TO THE GLOBAL EXISTENCE OF THE CAUCHY PROBLEM OF THE KELLER–SEGEL SYSTEM [J] . TOSHITAKA NAGAI, TAKAYOSHI OGAWA Communications in Contemporary Mathematics . 2011,第5期

机译：BREZIS-MERLE不等式及其在KELLER-SEGEL系统Cauchy问题的整体存在性中的应用
3. Supercritical degenerate parabolic-parabolic Keller-Segel system: existence criterion given by the best constant in Sobolev's inequality [J] . Wang Jinhuan, Li Yue, Chen Li ZAMP: Zeitschrift fur Angewandte Mathematik und Physik: = Journal of Applied Mathematics and Physics: = Journal de Mathematiques et de Physique Appliquees . 2019,第3期

机译：超临界退化抛物面 - 抛物线keller-segel系统：在Sobolev的不平等中最好的常量存在标准
4. REMARKS ON THE GLOBAL EXISTENCE OF WEAK SOLUTIONS TO QUASILINEAR DEGENERATE KELLER-SEGEL SYSTEMS [C] . Sachiko Ishida, Tomomi Yokota AIMS International Conference on Dynamical Systems, Differential Equations and Applications . 2013

机译：关于拟线性稀土凯勒 - SEGEL系统全球弱解决方案的备注
5. Global existence of solutions to nonlinear wave equations by weighted Strichartz inequalities. [D] . Alpay, Nimet. 2004

机译：加权Strichartz不等式对非线性波动方程解的整体存在性。
6. Colloquium PaperNonlinear partial differential equations and applications: On the global Cauchy problem for the nonlinear Schrödinger equation [O] . Jean Bourgain 2007

机译：非线性偏微分方程及其应用：关于非线性的整体柯西问题薛定er方程
7. A global existence result for a Keller-Segel type system with supercritical initial data [O] . Bartolucci, Daniele, Castorina, Daniele 2015

机译：Keller-segel型系统的全局存在结果超临界初始数据

Brezis-Merle inequalities and application to the global existence of the cauchy problem of the Keller-Segel system

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