Cortona 2010

SUMMER SCHOOL

Optimal Control of Partial Differential Equations

Cortona, July, 12-17, 2010

Materials for the courses

J. Sprekels (WIAS, Berlin)
INTRODUCTION TO OPTIMAL CONTROL PROBLEMS FOR PDEs

References and materials:

F. Tröltzsch
Optimal Control of Partial Differential Equations: Theory, Methods and Applications.
To appear spring 2010 in Graduate Studies in Mathematics, American Mathematical Society.

P. Neittaanmaki, J. Sprekels, D. Tiba
Optimization of Elliptic Systems: Theory and Applications.
Springer Monographs in Mathematics, Springer, New York 2006.

SLIDES of LECTURES

R. Hoppe (Augsburg and Houston University)
NUMERICAL METHODS FOR OPTIMAL CONTROL OF PDEs

References and materials:

Hoppe R.H.W.
Numerical solution of parabolic optimal control problems

Hoppe R.H.W.
Numerical solution of elliptic optimal control problems

Hoppe R.H.W.
Adaptive finite element methods for elliptic optimal control problems

Hoppe R.H.W.
Diffeomorphic matching and dynamic deformable surfaces with
applications in 3d medical imaging

M. Grepl (Aachen) and G. Rozza (EPFL, Lousanne)
MODEL REDUCTION METHODS

References and materials:

Huynh D.B.P., Patera A.T., Rozza G.
Reduced basis approximation and a posteriori error estimation for
affinely parametrized elliptic coercice partial differential equations

Grepl M.A., Patera A.T.
A posterior error bounds for reduced-basis approximation of
parametrized parabolic partial differential equations

Grepl M.A., Maday Y., Nguyen N.C., Patera A.T.
Efficient reduced-basis treatment of nonaffine and nonlinear
partial differential equations