Aktuelles Semester: Wintersemester 2017/18

• Übung zur Vorlesung Grundlagen der Optimierung
• Übung zur Vorlesung Mathematik I (für IF, ET, Ph)

Zeitschriftenartikel

1. Apel, T., Pfefferer, J., Winkler, M.:
   Error Estimates for the postprocessing approach applied to Neumann boundary control problems in polyhedral domains, accepted for publication,
   IMA J. Numer. Anal., 2017. [ Preprint ]
2. Apel, T., Steinbach, O., Winkler, M.:
   Error Estimates for Neumann Boundary Control Problems with Energy Regularization,
   J. Numer. Math., 24(4):207-233, 2016. [ Preprint ]
3. Apel, T., Pfefferer, J., Winkler, M.:
   Local Mesh Refinement for the Discretization of Neumann Boundary Control Problems on Polyhedra,
   Math. Methods Appl. Sci., 39(5):1206-1232, 2015. [ Preprint ]
4. Apel, T., Lombardi, A. L., Winkler, M.:
   Anisotropic mesh refinement in polyhedral domains: error estimates with data in L2(Ω),
   ESAIM. Math. Model. Numer. Anal. 48(4): 1117-1145, 2014. [ Preprint ]
5. Grossmann, C., Winkler, M.:
   Mesh-Independent Convergence of Penalty Methods Applied to Optimal Control with Partial Differential Equations,
   Optimization 62(5): 629-647, 2013. [ Preprint ]
6. Grossmann, C., Winkler, M.:
   A Mesh-Independence Principle for Quadratic Penalties Applied to Semilinear Elliptic Boundary Control,
   Schedae Informaticae 21: 9-26, 2012. [ Preprint ]

Abschlussarbeiten

1. Diplomarbeit: Strafmethoden für steuerbeschränkte Kontrollprobleme, TU Dresden, 2011.
2. Doktorarbeit: Finite element error analysis for Neumann boundary control problems on polyhedral domains, UniBw München, 2015.