个人信息Personal Information
教授
博士生导师
硕士生导师
性别:男
毕业院校:吉林大学
学位:博士
所在单位:数学科学学院
学科:基础数学
办公地点:创新园大厦 A1032
电子邮箱:snzheng@dlut.edu.cn
Uniqueness of weak solutions to a high dimensional Keller-Segel equation with degenerate diffusion and nonlocal aggregation
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论文类型:期刊论文
发表时间:2016-03-01
发表刊物:NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS
收录刊物:SCIE、EI
卷号:134
页面范围:204-214
ISSN号:0362-546X
关键字:Keller-Segel model; Degenerate diffusion; Nonlocal aggregation; Uniqueness of weak solutions; Optimal transportation; Wasserstein distance
摘要:This paper considers weak solutions to the degenerate Keller-Segel equation with nonlocal aggregation: u(t) = Delta u(m) - del . (uB(u)) in R-d x R+, where B(u) = del((-Delta)(-beta/2) u), d >= 3, beta is an element of [2, d), 1 < m < 2 - beta/d. In a previous paper of the authors (Hong et al., 2015), a criterion was established for global existence versus finite time blow-up of weak solutions to the problem. A natural question is whether the uniqueness is true for the weak solutions obtained. A positive answer is given in this paper that the global weak solutions must be unique provided the second moment of initial data is finite, which means that the weak solutions are weak entropy solutions in fact. The framework of the proof is based on the optimal transportation method. (C) 2016 Elsevier Ltd. All rights reserved.