967 research outputs found
Unified Approach to Convex Robust Distributed Control given Arbitrary Information Structures
We consider the problem of computing optimal linear control policies for
linear systems in finite-horizon. The states and the inputs are required to
remain inside pre-specified safety sets at all times despite unknown
disturbances. In this technical note, we focus on the requirement that the
control policy is distributed, in the sense that it can only be based on
partial information about the history of the outputs. It is well-known that
when a condition denoted as Quadratic Invariance (QI) holds, the optimal
distributed control policy can be computed in a tractable way. Our goal is to
unify and generalize the class of information structures over which quadratic
invariance is equivalent to a test over finitely many binary matrices. The test
we propose certifies convexity of the output-feedback distributed control
problem in finite-horizon given any arbitrarily defined information structure,
including the case of time varying communication networks and forgetting
mechanisms. Furthermore, the framework we consider allows for including
polytopic constraints on the states and the inputs in a natural way, without
affecting convexity
On the Equivalence of Youla, System-level and Input-output Parameterizations
A convex parameterization of internally stabilizing controllers is
fundamental for many controller synthesis procedures. The celebrated Youla
parameterization relies on a doubly-coprime factorization of the system, while
the recent system-level and input-output characterizations require no
doubly-coprime factorization but a set of equality constraints for achievable
closed-loop responses. In this paper, we present explicit affine mappings among
Youla, system-level and input-output parameterizations. Two direct implications
of the affine mappings are 1) any convex problem in Youla, system level, or
input-output parameters can be equivalently and convexly formulated in any
other one of these frameworks, including the convex system-level synthesis
(SLS); 2) the condition of quadratic invariance (QI) is sufficient and
necessary for the classical distributed control problem to admit an equivalent
convex reformulation in terms of Youla, system-level, or input-output
parameters.Comment: 8 pages, 3 figure
Realizability and Internal Model Control on Networks
It is proved that network realizability of controllers can be enforced
without conservatism using convex constraints on the closed loop transfer
function. Once a network realizable closed loop transfer matrix has been found,
a corresponding controller can be implemented using a network structured
version of Internal Model Control.Comment: 3 page
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