Minimum Residual & Least-Squares Finite Element Methods
Fourth Workshop
This workshop takes place from September 16th to September 18th, 2019. It aims to bring together global researchers working on Least-Squares Finite Element Methods, Discontinuous Petrov Galerkin Methods, and other emerging methods built around residual minimization properties.
It is the fourth in a series of workshops with the same goal. The first workshop in this series was held in Austin, Texas, in 2013. The second workshop was held in Delft, The Netherlands, in 2015. The third edition, organized under the umbrella of USACM (United States Association for Computational Mechanics) Workshops, was held at Portland State University, Oregon, USA.
Following speakers already confirmed their participation
- Constantin Bacuta
- Pavel Bochev
- Daniele Boffi
- Zhiqiang Cai
- Victor Calo
- Witold Cecot
- Wolfgang Dahmen
- Leszek Demkowicz
- Thomas Führer
- Marc Gerritsma
- Jay Gopalakrishnan
- Norbert Heuer
- Steffen Henneking
- Varun Jain
- Andrew Kercher
- Rui Ma
- Jaime Mora
- Steffen Münzenmaier
- Ignacio Muga
- Olga Mula
- Maciej Paszynski
- Paulina Sepulveda
- Gerhard Starke
- Rob Stevenson
- Johannes Storn
- Yizhi Sun
- Kris van der Zee
- Panayot Vassilevski
- Chad Westphal
Registration
Speakers are by invitation only. Visitors are welcome to attend the lectures and to present a poster. Subscribe as visitor or course member by sending an e-mail with your first name, last name, and affiliation and the subject to the organizers (dpgls2019 (at) math.hu-berlin.de).
Organizers
- Prof. Carsten Carstensen, Humboldt-Universität zu Berlin
- Prof. Fleurianne Bertrand, Humboldt-Universität zu Berlin
Acknowledgements
The organizers gratefully acknowledge support by the Berlin Mathematics Research Center MATH+ and by the Deutsche Forschungsgemeinschaft in the Priority Program 1748 "Reliable simulation techniques in solid mechanics. Development of non-standard discretization methods, mechanical and mathematical analysis" under the projects "Foundation and application of generalized mixed FEM towards nonlinear problems in solid mechanics" and "Approximation and reconstruction of stresses in the deformed configuration for hyperelastic material models".