Existence and large time behavior to coupled chemotaxis-fluid equations in Besov–Morrey spaces

The paper deals with the Cauchy problem of coupled chemotaxis-fluid equations. By taking advantage of a coupling structure of the equations and using the semigroup approach, we show existence and asymptotic stability with small initial data and external force (u0,n0,∇c0,c0)∈N˙r1,λ,∞−β1×N˙r2,λ,∞−β2×N...

Full description

Saved in:
Bibliographic Details
Published inJournal of Differential Equations Vol. 266; no. 9; pp. 5867 - 5894
Main Authors Yang, Minghua, Fu, Zunwei, Sun, Jinyi
Format Journal Article
LanguageEnglish
Published Elsevier Inc 15.04.2019
Subjects
Besov–Morrey space
Global solution
Keller–Segel equation
Large time behavior
Navier–Stokes system
secondary
Navier–Stokes system
Besov–Morrey space
Global solution
Large time behavior
primary
Keller–Segel equation
Online AccessGet full text

Cover

More Information
Summary:The paper deals with the Cauchy problem of coupled chemotaxis-fluid equations. By taking advantage of a coupling structure of the equations and using the semigroup approach, we show existence and asymptotic stability with small initial data and external force (u0,n0,∇c0,c0)∈N˙r1,λ,∞−β1×N˙r2,λ,∞−β2×N˙r3,λ,∞−β3×L∞,∇ϕ∈MN−λ,λ for certain technical assumptions. For the embedded relationship between function spaces, we show that our initial data class is larger than that of Kozono et al. (2016) [11] and covers physical cases of initial aggregation at points (Diracs) and on filaments. As an application, we obtain a class of asymptotically existence of a basin of attraction for each self-similar solutions with homogeneous initial data.
ISSN:0022-0396
1090-2732
DOI:10.1016/j.jde.2018.10.050