# Optimal Damping of Vibrating Systems

Thus, our goal is to develop efficient approaches for solving problems which appear in damping optimization but also in closely connected issues such as optimality of the solution of the linear systems, stability via Lyapunov and optimal control. Another problem is the analysis of the system structure induced by the dissipativity of the system. Solving such problems is both a highly relevant and difficult task. We also investigate algorithms which can accelerate the optimization process while still ensuring accuracy.

This project will deal with optimizing certain robustness measures in order to make the controlled system robust with respect to perturbations. Therefore, we consider norm optimization as well as feedback stabilization and eigenvalue assignment problems for large-scale and medium-sized dynamical systems. We will investigate the possibility of applying a new approach for robust control of such systems based on pseudospectra.

Within the norm optimization of large-scale dynamical systems, we will also consider optimization of the trace of the solution of the corresponding parameter dependent Lyapunov equation. We will use a new linearized model without a simultaneous diagonalization of the component matrices. For this problem a better understanding of the properties of large-scale dynamical systems is required. The usage of model order reduction approaches is investigated for this task, such that important system characteristics can be drawn at a highly reduced numerical effort from a reduced order model. Additionally, we will derive a theory which will describe the geometry of the corresponding eigenspaces as well as the relative perturbation bounds for corresponding eigenvalues.

For the numerical solution of the occurring matrix equation within this optimization process, we use methods developed at the MPI Magdeburg, e.g., low-rank ADI type methods.

Regarding the feedback stabilization we will also consider the case of active damping with direct velocity feedback, since one can obtain almost the same second order system as with passive damping. In particular, the system: with output and an active control leads to . Since the system is almost the same as in the investigation of passive damping, we investigate if some of our existing results can also be applied in active damping.

**Related publications:**

**Related talks:**

- M. Voigt

Linear-Quadratic Optimal Control of Differential-Algebraic Equations,

Workshop within DAAD project Optimal Damping of Vibrating Systems, J. J. Strossmayer University of Osijek, Croatia, October 7-10, 2014 - P. Kürschner

Low-rank Solutions of Lyapunov Equations,

Workshop within DAAD project Optimal Damping of Vibrating Systems, J. J. Strossmayer University of Osijek, Croatia, October 7-10, 2014 - J. Denißen

Quadratic eigenvalue problems and optimal damping,

Workshop within DAAD project Optimal Damping of Vibrating Systems, J. J. Strossmayer University of Osijek, Croatia, October 7-10, 2014 - P. Kürschner

Semi-active damping optimization of vibrational systems using dimension reduction,

*Complexity Reducing Formulations in Optimization*, OvGU Magdburg, February 24-28, 2014 - J. Denißen

Trigonometric spline approximation bounds on the solution of linear time-periodic systems,

*Seminar on Optimization and Applications at Josip Juraj Strossmayer University Osijek*, Osijek, Croatia, March 13, 2013