348 research outputs found
Finite-time behavior of inner systems
In this paper, we investigate how nonminimum phase characteristics of a dynamical system affect its controllability and tracking properties. For the class of linear time-invariant dynamical systems, these characteristics are determined by transmission zeros of the inner factor of the system transfer function. The relation between nonminimum phase zeros and Hankel singular values of inner systems is studied and it is shown how the singular value structure of a suitably defined operator provides relevant insight about system invertibility and achievable tracking performance. The results are used to solve various tracking problems both on finite as well as on infinite time horizons. A typical receding horizon control scheme is considered and new conditions are derived to guarantee stabilizability of a receding horizon controller
Distributed Robust Set-Invariance for Interconnected Linear Systems
We introduce a class of distributed control policies for networks of
discrete-time linear systems with polytopic additive disturbances. The
objective is to restrict the network-level state and controls to user-specified
polyhedral sets for all times. This problem arises in many safety-critical
applications. We consider two problems. First, given a communication graph
characterizing the structure of the information flow in the network, we find
the optimal distributed control policy by solving a single linear program.
Second, we find the sparsest communication graph required for the existence of
a distributed invariance-inducing control policy. Illustrative examples,
including one on platooning, are presented.Comment: 8 Pages. Submitted to American Control Conference (ACC), 201
Controller Design via Experimental Exploration with Robustness Guarantees
For a partially unknown linear systems, we present a systematic control
design approach based on generated data from measurements of closed-loop
experiments with suitable test controllers. These experiments are used to
improve the achieved performance and to reduce the uncertainty about the
unknown parts of the system. This is achieved through a parametrization of
auspicious controllers with convex relaxation techniques from robust control,
which guarantees that their implementation on the unknown plant is safe. This
approach permits to systematically incorporate available prior knowledge about
the system by employing the framework of linear fractional representations
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