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An <i>n</i>-dimensional chemotaxis system with signal-dependent motility and generalized logistic source: global existence and asymptotic stabilization

Wenbin Lv, Qingyuan Wang

2020Proceedings of the Royal Society of Edinburgh Section A Mathematics51 citationsDOI

Abstract

Abstract This paper deals with the global existence for a class of Keller–Segel model with signal-dependent motility and general logistic term under homogeneous Neumann boundary conditions in a higher-dimensional smoothly bounded domain, which can be written as $$\eqalign{&amp; u_t = \Delta (\gamma (v)u) + \rho u-\mu u^l,\quad x\in \Omega ,\;t &gt; 0, \cr &amp; v_t = \Delta v-v + u,\quad x\in \Omega ,\;t &gt; 0.} $$ It is shown that whenever ρ ∈ ℝ, μ &gt; 0 and $$l &gt; \max \left\{ {\displaystyle{{n + 2} \over 2},2} \right\},$$ then the considered system possesses a global classical solution for all sufficiently smooth initial data. Furthermore, the solution converges to the equilibrium $$\left( {{\left( {\displaystyle{{\rho _ + } \over \mu }} \right)}^{1/(l-1)},{\left( {\displaystyle{{\rho _ + } \over \mu }} \right)}^{1/(l-1)}} \right)$$ as t → ∞ under some extra hypotheses, where ρ + = max{ ρ , 0}.

Topics & Concepts

HomogeneousOmegaDomain (mathematical analysis)Bounded functionNeumann boundary conditionBoundary (topology)CombinatoricsClass (philosophy)ChemotaxisMathematicsPhysicsMathematical analysisMathematical physicsReceptorComputer scienceChemistryBiochemistryArtificial intelligenceQuantum mechanicsMathematical Biology Tumor GrowthGene Regulatory Network AnalysisEvolution and Genetic Dynamics
An <i>n</i>-dimensional chemotaxis system with signal-dependent motility and generalized logistic source: global existence and asymptotic stabilization | Litcius