A New Convergence Analysis of Finite Element Methods for Elliptic Distributed Optimal Control Problems with Pointwise State Constraints

Susanne C Brenner,Li-Yeng Sung

doi:10.1137/16m1088090

A New Convergence Analysis of Finite Element Methods for Elliptic Distributed Optimal Control Problems with Pointwise State Constraints

Susanne C Brenner, Li-Yeng Sung

https://doi.org/10.1137/16m1088090

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Journal: Siam Journal on Control and Optimization	Publication Date: Jan 1, 2017
Citations: 29

#Elliptic Distributed Optimal Control Problems #Pointwise State Constraints + Show 8 more

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Abstract

We consider finite element methods for elliptic distributed optimal control problems with pointwise state constraints on two and three dimensional convex polyhedral domains formulated as fourth order variational inequalities. We develop a new convergence analysis that is applicable to $C^1$ finite element methods, classical nonconforming finite element methods and discontinuous Galerkin methods.

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