標題: | 拋物方程式之初始值與邊界值不相容的數值解法 Numerical study of the incompatible data between initial and boundary conditions for parabolic equations |
作者: | 盧韻尹 Lu, Yun-Yin 薛名成 Shiue, Ming-Cheng 應用數學系數學建模與科學計算碩士班 |
關鍵字: | 拋物方程式;初始值與邊界值不相容;數值解法;incompatible data;parabolic equations |
公開日期: | 2013 |
摘要: | In this thesis, the corner singularities from space-time domains for parabolic equations are considered.
Our work is to give an improved penalty method, with an initial condition approximated by a Helmholtz equation with a boundary layer, and a boundary condition approached by a second order ordinary differential equation. Basically, we extend the work in \cite{CQT11_1} and \cite{CQT11_2} and intend to numerically fix the incompatibility problems with the presence of both zeroth and first order incompatibilities. Through two examples on two dimensional domains (rectangle and disk), we demonstrate this method's practicality and usage. In short, from the point of view of comparative errors in $L^{\infty}$, $L^2$ and $H^1$ norm, this improved penalty method has better performance. In this thesis, the corner singularities from space-time domains for parabolic equations are considered. Our work is to give an improved penalty method, with an initial condition approximated by a Helmholtz equation with a boundary layer, and a boundary condition approached by a second order ordinary differential equation. Basically, we extend the work in \cite{CQT11_1} and \cite{CQT11_2} and intend to numerically fix the incompatibility problems with the presence of both zeroth and first order incompatibilities. Through two examples on two dimensional domains (rectangle and disk), we demonstrate this method's practicality and usage. In short, from the point of view of comparative errors in $L^{\infty}$, $L^2$ and $H^1$ norm, this improved penalty method has better performance. |
URI: | http://140.113.39.130/cdrfb3/record/nctu/#GT070052308 http://hdl.handle.net/11536/75322 |
Appears in Collections: | Thesis |