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SIAMCO
2008

Nonlinear Optimal Control via Occupation Measures and LMI-Relaxations

13 years 11 months ago
Nonlinear Optimal Control via Occupation Measures and LMI-Relaxations
We consider the class of nonlinear optimal control problems (OCP) with polynomial data, i.e., the differential equation, state and control constraints and cost are all described by polynomials, and more generally for OCPs with smooth data. In addition, state constraints as well as state and/or action constraints are allowed. We provide a simple hierarchy of LMI (linear matrix inequality)-relaxations whose optimal values form a nondecreasing sequence of lower bounds on the optimal value. Under some convexity assumptions, the sequence converges to the optimal value of the OCP. Preliminary results show that good approximations are obtained with few moments.
Jean B. Lasserre, Didier Henrion, Christophe Prieu
Added 14 Dec 2010
Updated 14 Dec 2010
Type Journal
Year 2008
Where SIAMCO
Authors Jean B. Lasserre, Didier Henrion, Christophe Prieur, Emmanuel Trélat
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