Shrinking self-similar solutions of a nonlinear diffusion equation with nondivergence form

被引:6
作者
Wang, CP [1 ]
Yin, JX [1 ]
机构
[1] Jilin Univ, Dept Math, Changchun 130012, Jilin, Peoples R China
来源
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS | 2004年 / 289卷 / 02期
基金
中国国家自然科学基金;
关键词
self-similar solution; shrinking; existence; uniqueness; singularity;
D O I
10.1016/j.jmaa.2003.08.021
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper we study the shrinking self-similar solutions of the nonlinear diffusion equation with nondivergence form partial derivativeu/partial derivativet = u(m) Deltau (mgreater than or equal to1). This kind of solutions possess the properties of finite speed propagation of perturbations and their supports are shrinking. We establish the existence and uniqueness for this kind of solutions. In addition, we study some properties of the shrinking self-similar solutions. (C) 2003 Elsevier Inc. All rights reserved.
引用
收藏
页码:387 / 404
页数:18
相关论文
共 50 条
[31]   Nonlinear Stability of Self-Similar Solutions for Semilinear Wave Equations [J].
Donninger, Roland .
COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS, 2010, 35 (04) :669-684
[32]   BESOV SPACES AND SELF-SIMILAR SOLUTIONS FOR NONLINEAR EVOLUTION EQUATIONS [J].
Miao Changxing ;
Zhang Bo .
JOURNAL OF PARTIAL DIFFERENTIAL EQUATIONS, 2006, 19 (01) :26-47
[33]   Self-similar solutions to a nonlinear parabolic-elliptic system [J].
Naito, Y ;
Suzuki, T .
TAIWANESE JOURNAL OF MATHEMATICS, 2004, 8 (01) :43-55
[34]   Self-similar solutions and translating solutions [J].
Lee, Yng-Ing .
COMPLEX AND DIFFERENTIAL GEOMETRY, 2011, 8 :193-203
[35]   Self-similar solutions for a class of non-divergence form equations [J].
Chunhua Jin ;
Jingxue Yin .
Nonlinear Differential Equations and Applications NoDEA, 2013, 20 :873-893
[36]   Self-similar solutions for a class of non-divergence form equations [J].
Jin, Chunhua ;
Yin, Jingxue .
NODEA-NONLINEAR DIFFERENTIAL EQUATIONS AND APPLICATIONS, 2013, 20 (03) :873-893
[37]   Self-similar solutions for the fractional viscous Burgers equation in Marcinkiewicz spaces [J].
de Oliveira, Edmundo Capelas ;
Lima, Maria Elismara de Sousa ;
Viana, Arlucio .
COMPUTATIONAL & APPLIED MATHEMATICS, 2025, 44 (01)
[38]   Exact self-similar solutions to the fragmentation equation with homogeneous discrete kernel [J].
Kostoglou, M .
PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS, 2003, 320 :84-96
[39]   Global Solutions with Asymptotic Self-Similar Behaviour for the Cubic Wave Equation [J].
Duyckaerts, Thomas ;
Negro, Giuseppe .
COMMUNICATIONS IN MATHEMATICAL PHYSICS, 2024, 405 (03)
[40]   Self-similar solutions for a semilinear heat equation with critical Sobolev exponent [J].
Naito, Yuki .
INDIANA UNIVERSITY MATHEMATICS JOURNAL, 2008, 57 (03) :1283-1315
12345