Convergence of the Dirichlet solutions of the very fast diffusion equation

Details Convergence of the Dirichlet solutions of the very fast diffusion equation Convergence of the Dirichlet solutions of the very fast diffusion equation

2010-12-15

arxiv.org/abs/1012.3218v1

Mathematics

Analysis of PDEs

33 pages

Scientific paper

For any $-10$, $0\le u_0\in L^{\infty}(R)$ such that $u_0(x)\le (\mu_0 |m||x|)^{\frac{1}{m}}$ for any $|x|\ge R_0$ and some constants $R_0>1$ and $0<\mu_0\leq \mu$, and $f,\,g \in C([0,\infty))$ such that $f(t),\, g(t) \geq \mu_0$ on $[0,\infty)$ we prove that as $R\to\infty$ the solution $u^R$ of the Dirichlet problem $u_t=(u^m/m)_{xx}$ in $(-R,R)\times (0,\infty)$, $u(R,t)=(f(t)|m|R)^{1/m}$, $u(-R,t)=(g(t)|m|R)^{1/m}$ for all $t>0$, $u(x,0)=u_0(x)$ in $(-R,R)$, converges uniformly on every compact subsets of $R\times (0,T)$ to the solution of the equation $u_t=(u^m/m)_{xx}$ in $R\times (0,\infty)$, $u(x,0)=u_0(x)$ in $R$, which satisfies $\int_Ru(x,t)\,dx=\int_Ru_0dx-\int_0^t(f(s)+g(s))\,ds$ for all $0

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