郑斯宁

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

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Positive effects of repulsion on boundedness in a fully parabolic attraction-repulsion chemotaxis system with logistic source

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论文类型:期刊论文

发表时间:2018-02-05

发表刊物:JOURNAL OF DIFFERENTIAL EQUATIONS

收录刊物:SCIE、Scopus

卷号:264

期号:3

页面范围:2011-2027

ISSN号:0022-0396

关键字:Attraction-repulsion; Fully parabolic; Chemotaxis; Boundedness; Logistic source

摘要:In this paper we study the global boundedness of solutions to the fully parabolic attraction-repulsion chemotaxis system with logistic source: u(t) = Delta u - chi del . (u del v) + xi del . (u del w) + f(u), v(t) = Delta v - beta v + alpha u, w(t) = Delta w - delta w + gamma u, subject to homogeneous Neumann boundary conditions in a bounded and smooth domain Omega subset of R-n (n >= 1), where chi, alpha, xi,gamma, beta and delta are positive constants, and f: R -> R is a smooth function generalizing the logistic source f(s) = a - bs(theta) for all s >= 0 with a >= 0, b >= 0 and theta >= 1. It is shown that when the repulsion cancels the attraction (i.e. chi alpha= xi gamma)>the solution is globally bounded if n <= 3, or 0 > 0(n):= min{n+2/4, n root n(2)+6n+17-n(2)-3n+4/4} with n >= 2 Therefore; due to theinhibition of repulsion to the attraction, in any spatial dimension, the exponent theta is allowed to take values less than 2 such that the solution is uniformly bounded in time. (c) 2017 Elsevier Inc. All rights reserved.