论文信息 - SELF-SIMILAR SOLUTIONS OF A SEMILINEAR HEAT EQUATION

SELF-SIMILAR SOLUTIONS OF A SEMILINEAR HEAT EQUATION

In this note we classify positive solutions of an equation$$\Delta u + \frac 1 2 x \cdot \nabla u + \frac 1 {p-1} u - |u|^{p-1} u =0\quad\text{in} \quad \bold R^N,$$where $1<p< (N+2)/N$. Under the assumption that $|x|^{2/(p-1)} u(x)$ is uniformlybounded in $\bold R^N$, we show that as $r=|x|$ tends to $\infty$, $r^{2/(p-1)} u(r \sigma)$converges uniformly to a continuous function $A(\sigma)$ on$S^{N-1}$. Conversely we also show that given any nonnegative continuous function$A(\sigma)$ on $S^{N-1}$,there exists a unique positive solution with that property.

Minkyu Kwak | Soyoung Cho | So-Hui Cho | Minkyu Kwak

[1] Minkyu Kwak. A semilinear heat equation with singular initial data , 1998, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.

[2] L. Peletier,et al. A very singular solution of the heat equation with absorption , 1986 .

[3] 鈴木貴,et al. Radial symmetry of self-similar solutions for semilinear heat equations (Methods and Applications for Functional Equations) , 1999 .

[4] Minkyu Kwak. A porous media equation with absorption. II. Uniqueness of the very singular solution , 1998 .

[5] L. Véron,et al. Anisotropic singularities of solutions of nonlinear elliptic equations in R2 , 1989 .

[6] Y. Naito. Non-uniqueness of solutions to the Cauchy problem for semilinear heat equations with singular initial data , 2004 .

[7] Minkyu Kwak. A Porous Media Equation with Absorption. I. Long Time Behaviour , 1998 .

[8] A. Friedman,et al. Nonlinear Parabolic Equations Involving Measures as Initial Conditions , 1981 .