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Communication Dans Un Congrès Année : 2021

Stabilizing Integral Delay Dynamics and Hyperbolic Systems using a Fredholm Transformation

Résumé

In this paper, we design a stabilizing statefeedback control law for a system represented by a general class of integral delay equations. Under an appropriate spectral controllability assumption, an implementable control law is proposed. The approach is constructive and makes use of the well-known backstepping methodology. Due to the integral terms present in the original system, the proposed problem requires a Fredholm transform, which is not always invertible. The invertibility of this transformation is proved using an operator formulation. In particular, we show that this invertibility property is a consequence of spectral controllability. The existence of the kernels defining the Fredholm transform is proved similarly by showing that they satisfy an invertible integral equation. Some test case simulations complete the paper.
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Dates et versions

hal-03357334 , version 1 (28-09-2021)

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Jeanne Redaud, Jean Auriol, Silviu-Iulian Niculescu. Stabilizing Integral Delay Dynamics and Hyperbolic Systems using a Fredholm Transformation. IEEE 60th Conference on Decision and Control (CDC 2021), Dec 2021, Austin, Texas, United States. ⟨10.1109/cdc45484.2021.9683496⟩. ⟨hal-03357334⟩
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