Chunjuan Hou scite author profile

<abstract><p>In this paper, we investigate the spectral element approximation for the optimal control problem of parabolic equation, and present a hp spectral element approximation scheme for the parabolic optimal control problem. For improve the accuracy of the algorithm and construct an adaptive finite element approximation. Under the Scott-Zhang type quasi-interpolation operator, a $ L^2(H^1)-L^2(L^2) $ posteriori error estimates of the hp spectral element approximated solutions for both the state variables and the control variable are obtained. Adopting two auxiliary equations and stability results, a $ L^2(L^2)-L^2(L^2) $ posteriori error estimates are derived for the hp spectral element approximation of optimal parabolic control problem.</p></abstract>

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On the Boussinesq system: local well-posedness of the strong solution and inviscid limits

Guo

Hou

2019

Bound Value Probl

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Chunjuan Hou

Superconvergence property of finite element methods for parabolic optimal control problems

A posteriori error estimates of mixed finite element solutions for fourth order parabolic control problems

Erratum to: Simultaneous determination of trimethylamine, formaldehyde and benzene via the cataluminescence of In3LaTi2O10 nanoparticles

A posteriori error estimates of hp spectral element method for parabolic optimal control problems

On the Boussinesq system: local well-posedness of the strong solution and inviscid limits

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