Averaged controllability of parameter dependent conservative semigroups
Loheac J, Zuazua E (2017)
Publication Type: Journal article
Publication year: 2017
Journal
Book Volume: 262
Pages Range: 1540-1574
Journal Issue: 3
DOI: 10.1016/j.jde.2016.10.017
Abstract
We consider the problem of averaged controllability for parameter depending (either in a discrete or continuous fashion) control systems, the aim being to find a control, independent of the unknown parameters, so that the average of the states is controlled. We do it in the context of conservative models, both in an abstract setting and also analysing the specific examples of the wave and Schrödinger equations. Our first result is of perturbative nature. Assuming the averaging probability measure to be a small parameter-dependent perturbation (in a sense that we make precise) of an atomic measure given by a Dirac mass corresponding to a specific realisation of the system, we show that the averaged controllability property is achieved whenever the system corresponding to the support of the Dirac is controllable. Similar tools can be employed to obtain averaged versions of the so-called Ingham inequalities. Particular attention is devoted to the 1d wave equation in which the time-periodicity of solutions can be exploited to obtain more precise results, provided the parameters involved satisfy Diophantine conditions ensuring the lack of resonances.
Authors with CRIS profile
Involved external institutions
Université Nantes Angers Le Mans
France (FR)
University of Deusto / Universidad de Deusto
Spain (ES)
France (FR)
University of Deusto / Universidad de Deusto
Spain (ES)
How to cite
APA:
Loheac, J., & Zuazua, E. (2017). Averaged controllability of parameter dependent conservative semigroups. Journal of Differential Equations, 262(3), 1540-1574. https://dx.doi.org/10.1016/j.jde.2016.10.017
MLA:
Loheac, Jerome, and Enrique Zuazua. "Averaged controllability of parameter dependent conservative semigroups." Journal of Differential Equations 262.3 (2017): 1540-1574.
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