Structured $H_\infty$-Optimal Control for Nested Interconnections: A State-Space Solution
Abstract
If imposing general structural constraints on controllers, it is unknown how to design -controllers by convex optimization. Under a so-called quadratic invariance structure of the generalized plant, the Youla parametrization allows to translate the structured synthesis problem into an infinite-dimensional convex program. Nested interconnections that are characterized by a standard plant with a block-triangular structure fall into this class. Recently it has been shown how to design optimal -controllers for such nested structures in the state-space by solving algebraic Riccati equations. In the present paper we provide a state-space solution of the corresponding output-feedback synthesis problem without any counterpart in the literature. We argue that a solution based on Riccati equations is - even for state-feedback problems - not feasible and we illustrate our results by means of a simple numerical example.
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Cite
@article{arxiv.1305.1746,
title = {Structured $H_\infty$-Optimal Control for Nested Interconnections: A State-Space Solution},
author = {Carsten W. Scherer},
journal= {arXiv preprint arXiv:1305.1746},
year = {2013}
}
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17 pages