Goal-oriented space-time adaptivity for the Navier--Stokes equations based on the dual weighted residual method
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Abstract
This work presents a goal-oriented a posteriori error estimator based on the Dual Weighted Residual (DWR) method together with space-time mesh adaptivity for the Navier--Stokes equations.
The resulting nonlinear algebraic systems on the space-time slabs are solved by Newton's method with GMRES, preconditioned by a slab-wise geometric multigrid method.
This combination yields reliable control of target quantities on computationally feasible space-time meshes together with a robust and efficient solution of the algebraic systems.
The implementation is based on a MPI-parallel programming model in the this http URL library.
Further ingredients are a discontinuous Galerkin discretization in time and inf-sup stable finite element pairs with discontinuous pressure on tensor-product meshes.
The performance of the approach is investigated in benchmark computations with regard to accuracy, efficiency, and stability.