Title :
Optimal l∞ to l∞ estimation for periodic systems
Author :
Voulgaris, Petros G.
Author_Institution :
Coordinated Sci. Lab., Illinois Univ., Champaign, IL, USA
fDate :
9/1/1996 12:00:00 AM
Abstract :
In this paper we consider the problem of finding a filter that minimizes the worst-case magnitude (l∞) of the estimation error in the case of linear periodically time-varying systems subjected to unknown but magnitude-bounded (l∞) inputs. These inputs consist of process and observation noises, and the optimization problem is considered over an infinite-time horizon. Lifting techniques are utilized to transform the problem to a time invariant l1-model matching problem subject to additional constraints. Taking advantage of the particular structure of the estimation problem, it is shown how standard methods of l1 optimization, in particular the delay augmentation technique, can be suitably modified to solve this nonstandard problem
Keywords :
discrete time systems; filtering theory; linear systems; multidimensional systems; optimisation; state estimation; time-varying systems; delay augmentation; discrete time systems; estimation error; filtering; finite dimensional systems; l∞ estimation; lifting techniques; linear systems; model matching; observation noise; optimization; periodic systems; process noise; time-varying systems; Constraint optimization; Eigenvalues and eigenfunctions; Equations; Linear programming; Loss measurement; Noise measurement; Signal processing; State estimation; Transforms; Uncertainty;
Journal_Title :
Automatic Control, IEEE Transactions on
