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Boundedness and asymptotic stabilization in a two-dimensional Keller–Segel–Navier–Stokes system with sub-logistic source

Feng Dai, Tian Xiang

2022Mathematical Models and Methods in Applied Sciences16 citationsDOI

Abstract

This paper mainly deals with a Keller–Segel–Navier–Stokes model with sub-logistic source in a two-dimensional bounded and smooth domain. For a large class of cell kinetics including sub-logistic sources, it is shown that under an explicit condition involving the chemotactic strength, asymptotic “damping” rate and initial mass of cells, the associated no-flux/no-flux/Dirichlet problem possesses a global and bounded classical solution. Moreover, a systematical treatment has been conducted on convergence of bounded solutions toward constant equilibrium in [Formula: see text] for sub- and standard logistic sources. In such chemotaxis-fluid setting, our boundedness improves known blow-up prevention by logistic source to blow-up prevention by sub-logistic source, indicating standard logistic source is not the weakest damping source to prevent blow-up, and our stability improves known algebraic convergence under quadratic degradation to exponential convergence under log-correction of quadratic degradation, implying log-correction of quadratic degradation quickens the decay of bounded solutions. These findings significantly improve and extend previously known ones.

Topics & Concepts

Bounded functionMathematicsDomain (mathematical analysis)Quadratic equationUniform boundednessExponential functionConstant (computer programming)Convergence (economics)Algebraic numberFlux (metallurgy)Applied mathematicsExponential decayMathematical analysisPhysicsGeometryComputer scienceMetallurgyNuclear physicsEconomicsEconomic growthProgramming languageMaterials scienceMathematical Biology Tumor GrowthGene Regulatory Network AnalysisMathematical and Theoretical Epidemiology and Ecology Models