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Global and blow-up solutions for non-linear degenerate parabolic systems

✍ Scribed by Zhi-wen Duan; Li Zhou

Publisher
John Wiley and Sons
Year
2003
Tongue
English
Weight
229 KB
Volume
26
Category
Article
ISSN
0170-4214

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✦ Synopsis

Abstract

In this paper the degenerate parabolic system u~t~=u(u~xx~+av). vt=v(v~xx~+bu) with Dirichlet boundary condition is studied. For $a. b {<} \lambda_{1} (\sqrt {ab} {<} \lambda_{1} {\rm if}, \alpha_{1} {\neq} \alpha_{2})$, the global existence and the asymptotic behaviour (Ξ±~1~=Ξ±~2~) of solution are analysed. For $a. b ,{>}, \lambda_{1}\ (\sqrt{ab} {>} \lambda_{1} {\rm if}, \alpha_{1} {\neq} \alpha_{2})$, the blow‐up time, blow‐up rate and blow‐up set of blow‐up solution are estimated and the asymptotic behaviour of solution near the blow‐up time is discussed by using the β€˜energy’ method. Copyright Β© 2003 John Wiley & Sons, Ltd.

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