Approximation by Simple Poles-Part I: Density and Geometric Convergence Rate in Hardy Space
成果类型:
Article
署名作者:
Fisher, Michael W.; Hug, Gabriela; Dorfler, Florian
署名单位:
University of Waterloo; Swiss Federal Institutes of Technology Domain; ETH Zurich
刊物名称:
IEEE TRANSACTIONS ON AUTOMATIC CONTROL
ISSN/ISSBN:
0018-9286
DOI:
10.1109/TAC.2023.3340314
发表日期:
2024
页码:
4894-4909
关键词:
H-infinity and H-2 control
optimal control
system level synthesis
摘要:
Optimal linear feedback control design is a valuable but challenging problem due to the nonconvexity of the underlying optimization and the infinite dimensionality of the Hardy space of stabilizing controllers. A powerful class of techniques for solving optimal control problems involves using reparameterization to transform the control design into a convex but infinite-dimensional optimization. To make the problem tractable, historical work focuses on Galerkin-type finite-dimensional approximations to Hardy space, especially those involving Lorentz series approximations such as the finite impulse response approximation. However, Lorentz series approximations can lead to infeasibility, difficulty incorporating prior knowledge, deadbeat control in the case of finite impulse response, and increased suboptimality. The goal of this two-part article is to introduce a new Galerkin-type method based on approximation by transfer functions with a selection of simple poles, and to apply this simple pole approximation for optimal control design. In Part I, error bounds for approximating arbitrary transfer functions in Hardy space are provided based on the geometry of the pole selection. It is shown that the space of transfer functions with these simple poles converges to the full Hardy space, and a uniform convergence rate is provided based purely on the geometry of the pole selection. This is then specialized to derive a convergence rate for a particularly interesting pole selection based on an Archimedes spiral. In Part II, the simple pole approximation is combined with system-level synthesis, a recent reparameterization approach, to develop a new control design method with desirable properties and bounded suboptimality.
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