He started his research as a Ph.D. student working on mathematical programs with vanishing constraints. Since January 1, 2010, he is working as a postdoc.
She started her research as a Ph.D. student working on different aspects of mathematical programs with equilibrium constraints. Since September 1, 2011, she is working as a Postdoc.
He started his research in October 2008 and is working on nonsmooth reformulations and corresponding algorithms for the solution of generalized Nash equilibrium problems. His research is supported by a grant from the DFG (Deutsche Forschungsgemeinschaft).
She started her research in October 2011 and is working on a new approach for solving generalized Nash equilibrium problems. Her research is supported by a grant from the DFG (Deutsche Forschungsgemeinschaft).
She worked on different aspects of mathematical programs with equilibrium constraints and completed her Ph.D. studies with a thesis on "Mathematical Programs with Complementarity Constraints: Theory, Methods, and Applications" in August 2011. Her research was partially supported by the International Doctorate Program "Identification, Optimization, and Control with Application in Modern Technologies" of the Elite Network from Bavaria (ENB Bayern).
He worked on an application of large scale partial differential complementarity systems in porous media and completed his Ph.D. studies with a thesis on "The Semismooth Newton Method for the Solution of Reactive Transport Problems Including Mineral Precipitation-Dissolution Reactions" in February 2011. His research is supported by a grant from the DFG.
She worked on generalized Nash equilibrium problems and finished her Ph.D. studies with a thesis on "Numerical Methods for the Solution of Generalized Nash Equilibrium Problems" in August 2009. Her research war mainly supported by a grant from the International Doctorate Program "Identification, Optimization, and Control with Application in Modern Technologies" of the Elite Network from Bavaria (ENB Bayern).
His research area were mathematical programs with vanishing constraints which is a topic closely related to the class of mathematical programs with equilibrium problems. He finished his Ph.D. studies with a thesis entitled "Mathematical Programs with Vanishing Constraints" in July 2009. His research was partially supported by a grant from the DFG.
He worked on globally convergent methods for the solution of mathematical programs with equilibrium constraints and finished his Ph.D. studies with a thesis on "Globale Minimierung von linearen Programmen mit Gleichgewichtsrestriktionen und globale Konvergenz eines Filter-SQPEC-Verfahrens für Mathematische Programme mit Gleichgewichtsrestriktionen" in June 2009. His research was partially supported by the Hanns-Seidel-Stiftung.
He worked on affine-scaling methods and finished his Ph.D. studies with a thesis on "Affine-Scaling Methods for Nonlinear Minimization Problems and Nonlinear Systems of Equations with Bound Constraints" in July 2006 at the University of Würzburg.
She worked on complementarity problems and developped a new approach for the solution of this kind of problems. She finished her Ph.D. studies with a thesis on "Semismooth Least Squares Methods for Complementarity Problems" in July 2006 at the University of Würzburg.
He studied optimality conditions for mathematical progams with equilibrium constraints and finished his Ph.D. studies at the University of Würzburg in March 2005 with a thesis titled "Constraint Qualifications and Stationarity Concepts for Mathematical Programs with Equilibrium Constraints".
He worked on smoothing-type methods for the solution of semidefinite programs (first at the University of Hamburg, then at the University of Würzburg) and finished his Ph.D. studies in February 2004 with a thesis titled "Glättungsverfahren für semidefinite Programme". His research was partially supported by a grant from the DFG (Deutsche Forschungsgemeinschaft).
He worked on smoothing-type methods for the solution of linear programs and finished his Ph.D. studies (at the University of Hamburg) in August 2001 with a thesis titled "Smoothing-type Methods for Linear Programs". His research was supported by a grant from the DFG (Deutsche Forschungsgemeinschaft).