On the Stability of a Class of Robust Receding Horizon Control Laws for Constrained Systems
Goulart P. J. and Kerrigan E. C.
August 2005
Technical Report: CUED/F-INFENG/TR.532
Abstract
This paper is concerned with the stability of a class of robust and constrained optimal control laws for linear discrete-time systems subject to bounded state disturbances and arbitrary convex constraints on the states and inputs. The paper considers the class of feedback control policies parameterized as affine functions of the system state, calculation of which has recently been shown to be tractable via a suitable convex reparameterization. When minimizing the expected value of a quadratic cost, we show that the resulting value function in the optimal control problem is convex. When used in the design of a robust receding horizon controller, we provide sufficient conditions to establish that the closed-loop system is input-to-state stable (ISS). The paper further shows that the resulting control law has an interesting interpretation as the projection of the optimal unconstrained linear-quadratic control law onto the set of constraint-admissible control policies.
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BibTex Entry
- @TechReport{goulart:kerrigan:2005c,
- author = {Goulart P. J. and Kerrigan E. C. },
- institution = {Department of Engineering, University of Cambridge},
- title = {On the Stability of a Class of Robust Receding Horizon Control Laws for Constrained Systems},
- year = {2005},
- bibkey = {goulart:kerrigan:2005c},
- month = {August},
- note = {CUED/F-INFENG/TR.532}
- }
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