Thursday, February 18, 2016 - 11:00am - 12:00pm
Marius Tucsnak (Université de Bordeaux I)
This talk aims to introduce, as elementary as possible, some classical or more recent results in infinite dimensional systems theory, with emphasis on controllability and time optimal control questions. After recalling the main controllability types and their characterization by duality, we provide an infinite dimensional version of the Hautus test, which we apply to Schrodinger type systems.
Friday, March 18, 2016 - 10:30am - 11:00am
Lars Gruene (University of Bayreuth)
Receding Horizon Control (also known as Model Predictive Control) in the sense of this talk is a method for obtaining a feedback-like approximately optimal control for an infinite horizon optimal control problem by iteratively solving a series of finite horizon problems. It can thus be seen as a model reduction method in time. The talk presents conditions under which rigorous statements on the infinite horizon performance of the resulting closed loop trajectory can be made. Stability issues of the closed loop are also briefly addressed.
Friday, June 4, 2010 - 9:30am - 9:45am
Marius Tucsnak (Université de Nancy I (Henri Poincaré))
No Abstract
Friday, October 23, 2015 - 9:00am - 9:50am
Jorge Cortes (University of California, San Diego)
Recent work on linear control models for complex systems has examined their controllability properties and specifically explored the characterization of the ease (in terms of required energy) with which they can be controlled by means of a finite number of actuators, each affecting an individual node.
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