Due to the inequality feature of the obstacle problem, the standard quadratic finite element method for solving the problem can only achieve an error bound of the form O(N-3/4+epsilon), N being the total number of degrees of freedom, and epsilon > 0 arbitrary. To achieve a better error bound, the key lies in how to capture the free boundary accurately. In this paper, we propose a two level algorithm for solving the obstacle problem. The first part of the algorithm is through the use of the linear elements on a quasi-uniform mesh. Then information on the approximate free boundary from the linear element solution is used in the construction of a quadratic finite element method. Under some assumptions, it is shown that the numerical solution from the two level algorithm is expected to have a nearly optimal error bound of O(N-1+epsilon), epsilon > 0 arbitrary. Such an expected convergence order is observed numerically in numerical examples.

• 出版日期2018-8-1
• 单位西安交通大学