Title of article
Aggregation vs. global diffusive behavior in the higher-dimensional Keller–Segel model
Author/Authors
Michael Winkler، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
17
From page
2889
To page
2905
Abstract
We consider the classical parabolic–parabolic Keller–Segel system under homogeneous Neumann boundary conditions in a smooth bounded domain .
It is proved that in space dimension n 3, for each and p>n one can find ε0>0 such that if the initial data (u0,v0) satisfy u0 Lq(Ω)<ε and v0 Lp(Ω)<ε then the solution is global in time and bounded and asymptotically behaves like the solution of a discoupled system of linear parabolic equations. In particular, (u,v) approaches the steady state (m,m) as t→∞, where m is the total mass m:=∫Ωu0 of the population.
Moreover, we shall show that if Ω is a ball then for arbitrary prescribed m>0 there exist unbounded solutions emanating from initial data (u0,v0) having total mass ∫Ωu0=m.
Keywords
ChemotaxisGlobal existenceBoundednessBlow-up
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Serial Year
2010
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Record number
751757
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