On Error Estimates for Discretization Operators for the Solution of the Poisson Equation

Pub Date : 2024-04-09 DOI:10.1134/s0012266124010117
A. B. Utesov
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Abstract

A discretization operator for the solution of the Poisson equation with the right-hand side from the Korobov class is constructed and its error is estimated in the \(L^{p} \)-metric, \(2\leq p\leq \infty \). It is proved that for \(p=2 \) the resulting error estimate for the discretization operator is order sharp on the power scale. An error in calculating the trigonometric Fourier coefficients used when constructing the discretization operator is also found. It should be noted that the obtained estimate in one case is better than previously known estimates of the errors of discretization operators constructed from the values of the right-hand side of the equation at the nodes of the modified Korobov grid and the Smolyak grid, and in the other case it coincides with them up to constants.

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论求解泊松方程的离散化算子的误差估计值
Abstract 从 Korobov 类中构造了波松方程右边解的离散化算子,并在\(L^{p} \)度量中估计了其误差,\(2\leq p\leq \infty \)。结果证明,对于(p=2),离散化运算符的误差估计在幂级数上是尖锐的。计算离散化算子时使用的三角傅里叶系数时也发现了误差。值得注意的是,在一种情况下,所得到的估计值优于之前已知的根据修正的 Korobov 网格和 Smolyak 网格节点处方程右侧值构建的离散化算子误差估计值,而在另一种情况下,它与它们重合到常数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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