Divergence conforming DG method for the optimal control of the Oseen equation with variable viscosity

arXiv - CS - Numerical Analysis Pub Date : 2024-03-23 DOI:arxiv-2403.15783
Harpal Singh, Arbaz Khan
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Abstract

This study introduces the divergence-conforming discontinuous Galerkin finite element method (DGFEM) for numerically approximating optimal control problems with distributed constraints, specifically those governed by stationary generalized Oseen equations. We provide optimal a priori error estimates in energy norms for such problems using the divergence-conforming DGFEM approach. Moreover, we thoroughly analyze $L^2$ error estimates for scenarios dominated by diffusion and convection. Additionally, we establish the new reliable and efficient a posteriori error estimators for the optimal control of the Oseen equation with variable viscosity. Theoretical findings are validated through numerical experiments conducted in both two and three dimensions.
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粘性可变的奥森方程优化控制的发散符合 DG 方法
本研究介绍了发散-顺应非连续伽勒金有限元方法(DGFEM),用于对具有分布式约束的最优控制问题进行数值逼近,特别是那些受静态广义奥森方程支配的问题。此外,我们还深入分析了以扩散和对流为主的情况下的 $L^2$ 误差估计。此外,我们还为具有可变粘性的奥塞涅方程的最优控制建立了新的可靠、高效的后验误差估计值。理论研究结果通过二维和三维数值实验得到了验证。
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arXiv - CS - Numerical Analysis
arXiv - CS - Numerical Analysis
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