Günter Leugering; Sebastian Engell; Andreas Griewank; Michael Hinze; Rolf Rannacher; Volker Schulz; Michael Ulbrich; Ulbr Birkhauser Verlag AG (2012) Kovakantinen kirja
Günter Leugering (ed.); Peter Benner (ed.); Sebastian Engell (ed.); Andreas Griewank (ed.); Helmut Harbrecht (ed.); Hinze Birkhäuser (2015) Kovakantinen kirja
Günter Leugering; Sebastian Engell; Andreas Griewank; Michael Hinze; Rolf Rannacher; Volker Schulz; Michael Ulbrich; Ulbr Birkhauser Verlag AG (2014) Pehmeäkantinen kirja
Günter Leugering (ed.); Peter Benner (ed.); Sebastian Engell (ed.); Andreas Griewank (ed.); Helmut Harbrecht (ed.); Hinze Birkhäuser (2016) Pehmeäkantinen kirja
Alexander Martin; Kathrin Klamroth; Jens Lang; Günter Leugering; Antonio Morsi; Martin Oberlack; Manfred Ostrowski; Rosen Birkhauser Verlag AG (2012) Kovakantinen kirja
Alexander Martin (ed.); Kathrin Klamroth (ed.); Jens Lang (ed.); Günter Leugering (ed.); Antonio Morsi (ed.); Mar Oberlack Birkhäuser (2015) Pehmeäkantinen kirja
This special volume focuses on optimization and control of processes governed by partial differential equations. The contributors are mostly participants of the DFG-priority program 1253: Optimization with PDE-constraints which is active since 2006. The book is organized in sections which cover almost the entire spectrum of modern research in this emerging field. Indeed, even though the field of optimal control and optimization for PDE-constrained problems has undergone a dramatic increase of interest during the last four decades, a full theory for nonlinear problems is still lacking. The contributions of this volume, some of which have the character of survey articles, therefore, aim at creating and developing further new ideas for optimization, control and corresponding numerical simulations of systems of possibly coupled nonlinear partial differential equations. The research conducted within this unique network of groups in more than fifteen German universities focuses on novel methods of optimization, control and identification for problems in infinite-dimensional spaces, shape and topology problems, model reduction and adaptivity, discretization concepts and important applications. Besides the theoretical interest, the most prominent question is about the effectiveness of model-based numerical optimization methods for PDEs versus a black-box approach that uses existing codes, often heuristic-based, for optimization.