Singular solutions of parabolic p-Laplacian with absorption

被引：11

作者：

Chen, Xinfu ^{[1
]}

Qi, Yuanwei

Wang, Mingxin

机构：

[1] Univ Pittsburgh, Dept Math, Pittsburgh, PA 15260 USA

[2] Univ Cent Florida, Dept Math, Orlando, FL 32816 USA

[3] SE Univ, Dept Appl Math, Nanjing 210018, Peoples R China

来源：

TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY | 2007年 / 359卷 / 11期

关键词：

p-Laplacian; fast diffusion; absorption; fundamental solution; very singular solution;

D O I：

10.1090/S0002-9947-07-04336-X

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

We consider, for p is an element of (1, 2) and q > 1, the p-Laplacian evolution equation with absorption u(t) = div(|del(u)|(p-2)del u)-u(q) in R-n x (0,infinity). We are interested in those solutions, which we call singular solutions, that are non- negative, non- trivial, continuous in R-n x [0, infinity) \ {(0, 0)}, and satisfy u(x, 0) = 0 for all x not equal 0. We prove the following: (i) When q >= p - 1 + p/n, there does not exist any such singular solution. (ii) When q < p - 1 + p/n, there exists, for every c > 0, a unique singular solution u = u(c) that satisfies integral R-n u(., t). c as t SE arrow 0. Also, uc NE arrow u(infinity) as c NE arrow 8, where u(infinity) is a singular solution that satisfies integral R-n u(infinity)(., t) -> infinity as t SE arrow 0. Furthermore, any singular solution is either u(infinity) or u(c) for some finite positive c.

引用

页码：5653 / 5668

页数：16

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