Lassi Paunonen scite author profile

In this paper we consider robust output regulation of distributed parameter systems and the internal model principle. The main purpose is to generalize the internal model principle by Francis and Wonham for infinite-dimensional systems and clarify the relationships between different generalizations of the internal model. We also construct a signal generator capable of generating infinite-dimensional polynomially increasing signals.

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The Internal Model Principle for Systems with Unbounded Control and Observation

Paunonen¹,

Pohjolainen²

2014

SIAM J. Control Optim.

106

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In this paper the theory of robust output regulation of distributed parameter systems with infinite-dimensional exosystems is extended for plants with unbounded control and observation. As the main result, we present the internal model principle for linear infinite-dimensional systems with unbounded input and output operators. We do this for two different definitions of an internal model found in the literature, namely, the p-copy internal model and the G-conditions. We also introduce a new way of defining an internal model for infinite-dimensional systems. The theoretic results are illustrated with an example where we consider robust output tracking for a one-dimensional heat equation with boundary control and pointwise measurements.

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Controller Design for Robust Output Regulation of Regular Linear Systems

Paunonen

2016

IEEE Trans. Automat. Contr.

103

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We present three dynamic error feedback controllers for robust output regulation of regular linear systems. These controllers are (i) a minimal order robust controller for exponentially stable systems (ii) an observer-based robust controller and (iii) a new internal model based robust controller structure. In addition, we present two controllers that are by construction robust with respect to predefined classes of perturbations. The results are illustrated with an example where we study robust output tracking of a sinusoidal reference signal for a two-dimensional heat equation with boundary control and observation.Comment: 26 pages, 2 figures, to appear in IEEE Transactions on Automatic Contro

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Generalized absolute values, ideals and homomorphisms in mixed lattice groups

2020

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A mixed lattice group is a generalization of a lattice ordered group. The theory of mixed lattice semigroups dates back to the 1970s, but the corresponding theory for groups and vector spaces has been relatively unexplored. In this paper we investigate the basic structure of mixed lattice groups, and study how some of the fundamental concepts in Riesz spaces and lattice ordered groups, such as the absolute value and other related ideas, can be extended to mixed lattice groups and mixed lattice vector spaces. We also investigate ideals and study the properties of mixed lattice group homomorphisms and quotient groups. Most of the results in this paper have their analogues in the theory of Riesz spaces.

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Optimal energy decay in a one-dimensional coupled wave–heat system

Batty¹,

Paunonen

Seifert³

2016

J. Evol. Equ.

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Abstract. We study a simple one-dimensional coupled wave-heat system and obtain a sharp estimate for the rate of energy decay of classical solutions. Our approach is based on the asymptotic theory of C0-semigroups and in particular on a result due to Borichev and Tomilov [10], which reduces the problem of estimating the rate of energy decay to finding a growth bound for the resolvent of the semigroup generator. This technique not only leads to an optimal result, it is also simpler than the methods used by other authors in similar situations.

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Lassi Paunonen

Internal Model Theory for Distributed Parameter Systems

The Internal Model Principle for Systems with Unbounded Control and Observation

Controller Design for Robust Output Regulation of Regular Linear Systems

Generalized absolute values, ideals and homomorphisms in mixed lattice groups

Optimal energy decay in a one-dimensional coupled wave–heat system

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