Singular limit of solutions of the porous medium equation with absorption期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

Singular limit of solutions of the porous medium equation with absorption

Authors:	Kin Ming Hui

Affiliation:	Institute of Mathematics, Academia Sinica, Nankang, Taipei, 11529, Taiwan, R. O. C.

Abstract:	We prove that as the solutions $u^{(m)}$ of $u_{t}=Delta u^{m}-u^{p}$ , $(x,t)in R^{n}times (0,T)$ , , , , , $u(x,0)=f(x)in L^{1}(R^{n})cap L^{infty }(R^{n})$ , converges in $L^{1}_{loc}(R^{n}times (0,T))$ to the solution of the ODE $v_{t}=-v^{p}$ , , where $gin L^{1}(R^{n})$ , , satisfies in $mathcal{D}'(R^{n})$ for some function $widetilde {g}in L^{infty }_{loc}(R^{n})$ , , satisfying whenever for a.e. $xin R^{n}$ , $int _{E}widetilde {g}dxle C\|E\|^{2/n}$ for and $int _{E}\|nabla widetilde {g}\|dxle C\|E\|^{1/2}$ for , where is a constant and is any measurable subset of $R^{n}$ .

Keywords:	Singular limit porous medium equation with absorption

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