An unfitted HDG method for a distributed optimal convection-diffusion control problem
Abstract
We analyze a high order unfitted hybridizable discontinuous Galerkin (HDG) method for an optimal control problem governed by a convection-diffusion equation posed in a domain with piecewise-wise C2 boundary ∂ . The computational domain h does not necessarily fit and the Transfer Path Method (TPM) is used to transfer the boundary data from ∂ to ∂ h through segments of direction m. Under closeness conditions between ∂ h and ∂ and on the transfer vector m, we prove optimal order of convergence in the L2-norm for all variables of the state and adjoint problems. We also show numerical examples to complement the theory.
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