Extinction profile of the logarithmic diffusion equation

TL;DR

This paper studies the extinction profile of solutions to the logarithmic diffusion equation in certain dimensions, proving convergence to Barenblatt solutions under specific initial conditions.

Contribution

It establishes the uniform convergence of rescaled solutions to Barenblatt profiles for the logarithmic diffusion equation in specified dimensions.

Findings

Rescaled solutions converge uniformly to Barenblatt solutions as time approaches extinction.

Convergence holds for initial data bounded by Barenblatt solutions with additional integrability conditions.

The results extend understanding of the asymptotic behavior of solutions in the critical dimensions.

Abstract

Let $u$ be the solution of $u_t=\Delta\log u$ in $\R^N\times (0,T)$, N=3 or $N\ge 5$, with initial value $u_0$ satisfying $B_{k_1}(x,0)\le u_0\le B_{k_2}(x,0)$ for some constants $k_1>k_2>0$ where $B_k(x,t) =2(N-2)(T-t)_+^{N/(N-2)}/(k+(T-t)_+^{2/(N-2)}|x|^2)$ is the Barenblatt solution for the equation. We prove that the rescaled function $\4{u}(x,s)=(T-t)^{-N/(N-2)}u(x/(T-t)^{-1/(N-2)},t)$, $s=-\log (T-t)$, converges uniformly on $\R^N$ to the rescaled Barenblatt solution $\4{B}_{k_0}(x)=2(N-2)/(k_0+|x|^2)$ for some $k_0>0$ as $s\to\infty$. We also obtain convergence of the rescaled solution $\4{u}(x,s)$ as $s\to\infty$ when the initial data satisfies $0\le u_0(x)\le B_{k_0}(x,0)$ in $\R^N$ and $|u_0(x)-B_{k_0}(x,0)|\le f(|x|)\in L^1(\R^N)$ for some constant $k_0>0$ and some radially symmetric function $f$.