Mathematics of Computation

A-priori analysis and the finite element method for a class of degenerate elliptic equations

Author(s): Hengguang Li.
Journal: Math. Comp. 78 (2009), 713-737.
MSC (2000): Primary 35J70, 41A25, 41A50, 65N12, 65N15, 65N30, 65N50
Posted: September 2, 2008
Retrieve article in: PDF

Abstract: Consider the degenerate elliptic operator $\mathcal{L_\delta} := -\partial^2_x-\frac{\delta^2}{x^2}\partial^2_y$ on $\Omega:= (0, 1)\times(0, l)$ , for $\delta>0, l>0$ . We prove well-posedness and regularity results for the degenerate elliptic equation $\mathcal{L_\delta} u=f$ in $\Omega$ , $u\vert _{\partial\Omega}=0$ using weighted Sobolev spaces $\mathcal{K}^m_a$ . In particular, by a proper choice of the parameters in the weighted Sobolev spaces $\mathcal{K}^m_a$ , we establish the existence and uniqueness of the solution. In addition, we show that there is no loss of $\mathcal{K}^m_a$ -regularity for the solution of the equation. We then provide an explicit construction of a sequence of finite dimensional subspaces

for the finite element method, such that the optimal convergence rate is attained for the finite element solution $u_n\in V_n$ , i.e., $\vert\vert u-u_n\vert\vert _{H^1(\Omega)}\leq C{\rm {dim}}(V_n)^{-\frac{m}{2}}\vert\vert f\vert\vert _{H^{m-1}(\Omega)}$ with

independent of

and

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