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A priori error estimates of mixed finite element methods for nonlinear quadratic convex optimal control problem

机译：非线性二次凸出最优控制问题混合有限元方法的先验误差估计

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In this paper, we study an a priori error analysis for the quadratic optimal control problems governed by nonlinear elliptic partial differential equations using mixed finite element methods. The state and the co-state are approximated by the lowest order Raviart-Thomas mixed finite element spaces and the control is approximated by piecewise constant functions. A priori error estimates for the mixed finite element approximation of nonlinear optimal control problems is obtained. Some numerical examples are presented to confirm our theoretical results.

机译：本文研究了使用混合有限元方法对非线性椭圆局部微分方程治理的二次最佳控制问题的先验误差分析。状态和共态由最低阶raviart-thomas混合有限元空间近似，并且通过分段恒定函数近似控制。获得了对非线性最佳控制问题的混合有限元近似的先验误差估计。提出了一些数值例子以确认我们的理论结果。

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《International Conference on Electrical Engineering, Computing Science and Automatic Control 》|2008年||共5页
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Zhang H. W.; Lu Z. L.;
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中图分类 TP3-53;
关键词
Priori error estimates; mixed finite element method; optimal control;

机译：先验错误估计;混合有限元法;最优控制;

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3. A priori and a posteriori error estimates of H-1-Galerkin mixed finite element methods for optimal control problems governed by pseudo-hyperbolic integro-differential equations [J] . Chen Hongbo, Hou Tianliang Applied mathematics and computation . 2018 ,第期

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4. A priori error estimates of mixed finite element methods for nonlinear quadratic convex optimal control problem [C] . Zhang H. W., Lu Z. L. International Conference on Electrical Engineering, Computing Science and Automatic Control . 2008

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7. A Priori Error Estimates of Mixed Finite Element Methods for General Linear Hyperbolic Convex Optimal Control Problems [O] . Zuliang Lu, Xiao Huang 2014

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8. Optimum Mixed Finite Element Nonlinear Galerkin Method for the Navier-Stokes211 Equations I: Error Estimates for Spatial Discretization [R] . He, Y., Mattheij, R. M. M. 1997

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A priori error estimates of mixed finite element methods for nonlinear quadratic convex optimal control problem

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