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Many processes in engineering and across the sciences are described by partial differential equations. For the past decades the solution of the discretized equations using
iterative techniques has been and still is at the heart of the numerical analysis community. Advances in algorithms and computing technology has enabled scientist
to investigate inverse problems where the PDE is typically a constraint for the minimization of an objective function. In this project we focus on the efficient solution
of systems that arise from the first order conditions of the corresponding Lagrangian. For time-dependent problems we introduce a space-time formulation combined with
an all-at-Once approach. This means that we solve for all time-steps simultaneously. For this process no accurate solution of the PDE-constraints is required as we
typically only evaluate approximations of the PDE-discretization often using multigrid techniques. We focus here on time-dependent PDEs and in particular the interesting class
of time-periodic problems.
| 169 | Preconditioning for Allen-Cahn variational inequalities with non-local constraints; Luise Blank; Lavinia Sarbu; Martin Stoll; Journal of Computational Physics, 231, 5406-5420 : 2012. https://dx.doi.org/10.1016/j.jcp.2012.04.035. |
| 166 | Preconditioning for partial differential equation constrained optimization with control constraints; Martin Stoll; Andy Wathen; Numerical Linear Algebra with Applications : 19:53–71; 2012. |
| 168 | Preconditioning for Allen-Cahn variational inequalities with non-local constraints; Luise Blank; Lavinia Sarbu; Martin Stoll; Oberwolfach report - not refereed : 2010. |
| 165 | Block triangular preconditioners for PDE constrained optimization; Tyrone Rees; Martin Stoll; Numerical Linear Algebra with Applications Volume 17, Issue 6, pages 977–996, December 2010 : 2010. |
| 164 | All-at-once preconditioning in PDE-constrained optimization; Tyrone Rees; Martin Stoll; Andy Wathen; Kybernetika : Vol. 46 (2); 2010. |