数学
有限元法
分段
数学分析
伽辽金法
边值问题
规范(哲学)
趋同(经济学)
一致收敛
间断伽辽金法
边界(拓扑)
多边形网格
几何学
物理
经济
法学
带宽(计算)
计算机网络
经济增长
政治学
计算机科学
热力学
作者
Shicheng Liu,Xiangyun Meng,Qilong Zhai
标识
DOI:10.48550/arxiv.2306.15867
摘要
We consider the singularly perturbed fourth-order boundary value problem $\varepsilon ^{2}Δ^{2}u-Δu=f $ on the unit square $Ω\subset \mathbb{R}^2$, with boundary conditions $u = \partial u / \partial n = 0$ on $\partial Ω$, where $\varepsilon \in (0, 1)$ is a small parameter. The problem is solved numerically by means of a weak Galerkin(WG) finite element method, which is highly robust and flexible in the element construction by using discontinuous piecewise polynomials on finite element partitions consisting of polygons of arbitrary shape. The resulting WG finite element formulation is symmetric, positive definite, and parameter-free. Under reasonable assumptions on the structure of the boundary layers that appear in the solution, a family of suitable Shishkin meshes with $N^2$ elements is constructed ,convergence of the method is proved in a discrete $H^2$ norm for the corresponding WG finite element solutions and numerical results are presented.
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