P_0-approximation of Δ (H_0 ~2 ∩ W~(3,∞)) on square grids based on interior squares (Conference Paper)

Park C.

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P_0-approximation of Δ (H_0 ~2 ∩ W~(3,∞)) on square grids based on interior squares (Conference Paper)

机译：基于内部正方形的正方形网格上的Δ（H_0〜2∩W〜（3，∞））的P_0逼近（会议论文）

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We will approximate a function in Δ (H_0 ~2 ∩ W~3,∞) with a piecewise constant function on the square grids, whose degrees of freedom are based on the interior squares only. In spite of the slight lack of degrees of freedom, the approximation error is analyzed to be O(h) in L~2-norm, which is the optimal order for the piecewise-constant interpolation. The result in the paper is relevant to the finite element approximation for the divergence-free velocity in the Stokes problem with the locally divergence-free P_1-nonconforming space on the square grids.

机译：我们将在Δ（H_0〜2∩W〜3，∞）中近似一个函数，该函数在正方形网格上具有分段常数函数，其自由度仅基于内部正方形。尽管稍微缺乏自由度，但在L〜2范数中逼近误差分析为O（h），这是分段常数插值的最佳阶数。本文的结果与斯托克斯问题中无散度速度的有限元逼近有关，斯托克斯问题的方格上具有局部无散度的P_1-非协调空间。

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《Japan journal of industrial and applied mathematics》 |2013年第3期|共19页
作者
Park C.;
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正文语种 eng
中图分类工程数学;
关键词
Approximation; Sobolev;

机译：逼近;Sobolev;

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P_0-approximation of Δ (H_0 ~2 ∩ W~(3,∞)) on square grids based on interior squares (Conference Paper)

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