摘要
The paper deals with a Cauchy problem for the chemotaxis system with the effect of fluid■where d≥2.It is known that for each∈>0 and all sufficiently small initial data(u_(0),n_(0),c_(0))belongs to certain Fourier space,the problem possesses a unique global solution(u^(∈),n^(∈),c^(∈))in Fourier space.The present work asserts that these solutions stabilize to(u^(∞),n^(∞),c^(∞))as∈^(-1)→0.Moreover,we show that c^(∈)(t)has the initial layer as∈^(-1)→0.As one expects its limit behavior maybe give a new viewlook to understand the system.
基金
partial supported by the National Natural Science Foundation of China(Grant Nos.71774073,71988101)
Social Scienceof Jiangxi Provincial(Grant No.20YJ02)
Natural Science Foundation of Jiangxi Provincial(Grant No.20171BAA208019)
partial supported by Jiangxi Provincial Department of Education Science and Technology Research Project(GJJ213110)。
