On the well-posedness for Keller-Segel system with fractional diffusion

Communicated by M. Costabel In this paper, we study the Cauchy problem for the Keller–Segel system with fractional diffusion generalizing the Keller–Segel model of chemotaxis for the initial data (u0,v0) in critical Fourier‐Herz spaces B˙q2−2αRn×B˙q2−2αRn with q ∈ [2, ∞], where 1 < α ≤ 2. Making...

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Veröffentlicht in:	Mathematical methods in the applied sciences Jg. 34; H. 14; S. 1739 - 1750
Hauptverfasser:	Wu, Gang, Zheng, Xiaoxin
Format:	Journal Article
Sprache:	Englisch
Veröffentlicht:	Chichester, UK John Wiley & Sons, Ltd 30.09.2011 Wiley
Schlagworte:	Exact sciences and technology fractional diffusion Functional analysis Global analysis, analysis on manifolds Ill-posedness Keller-Segel model Mathematical analysis Mathematics nonlinear evolution equations nonlinear parabolic equations Numerical analysis Numerical analysis. Scientific computation Numerical linear algebra Partial differential equations Sciences and techniques of general use Topology. Manifolds and cell complexes. Global analysis and analysis on manifolds Well-posedness Keller-Segel model Numerical linear algebra Fourier analysis Evolution equation Well posed problem Littlewood Paley theory Mathematical method Cauchy problem Non linear equation Regularization method Parabolic equation Numerical analysis fractional diffusion Linear equation III-posedness Applied mathematics nonlinear parabolic equations Ill posed problem Localization nonlinear evolution equations Well-posedness
ISSN:	0170-4214, 1099-1476
Online-Zugang:	Volltext
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Zusammenfassung:	Communicated by M. Costabel In this paper, we study the Cauchy problem for the Keller–Segel system with fractional diffusion generalizing the Keller–Segel model of chemotaxis for the initial data (u0,v0) in critical Fourier‐Herz spaces B˙q2−2αRn×B˙q2−2αRn with q ∈ [2, ∞], where 1 < α ≤ 2. Making use of some estimates of the linear dissipative equation in the frame of mixed time‐space spaces, the Chemin ‘mono‐norm method’, the Fourier localization technique and the Littlewood–Paley theory, we get a local well‐posedness result and a global well‐posedness result with a small initial data. In addition, ill‐posedness for ‘doubly parabolic’ models is also studied. Copyright © 2011 John Wiley & Sons, Ltd.
Bibliographie:	Chinese Postdoctoral Science Foundation - No. 20090460553 istex:DAAB3592B02342C1BD3920DA905A7BAACEA5AF7A ArticleID:MMA1480 ark:/67375/WNG-BQ34G498-8
ISSN:	0170-4214 1099-1476
DOI:	10.1002/mma.1480