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Optimal Robust Distributed Control Towards Attosecond Synchronization Systems - Model, Analysis, and Synthesis Code
Citation Link: https://doi.org/10.15480/882.17065
Type
Source Code
Version
1.0.0
Date Issued
2026-05-07
Contact
Other Contributor
Language
English
Abstract
Code related to: Maximilian Schütte - "Optimal Robust Distributed Control Towards Attosecond Synchronization Systems," 2026 [1].
This content is relevant for researchers with background in control theory aiming to analyse or optimize the performance of synchronization systems.
1) Dynamic system modelling code for key components of the DESY laser-based synchronization system: piezo actuated mode-locked lasers in electro-otpical phase-locked loops (PLLs) and for piezo actuated time-of-flight stabilized optical fibres. Exemplary system parameters derived from [2] are supplied.
2) Control theoretic analysis code for robust H2-performance in terms of linear-matrix inequalities (LMIs) and integral-quadartic constraints (IQCs). In particular for linear-time-varying parametric uncertainty and time delay uncertainty.
3) Feedback controller synthesis code using IQC, LMI and nonsmooth optimization methods. Modifications to proprietary Mathworks code are not released due to licensing issues, but are described in [1]
4) Simulation code for case study results presented in [1].
[1] doi:10.15480/882.17063
[2] doi:10.15480/882.17064
This content is relevant for researchers with background in control theory aiming to analyse or optimize the performance of synchronization systems.
1) Dynamic system modelling code for key components of the DESY laser-based synchronization system: piezo actuated mode-locked lasers in electro-otpical phase-locked loops (PLLs) and for piezo actuated time-of-flight stabilized optical fibres. Exemplary system parameters derived from [2] are supplied.
2) Control theoretic analysis code for robust H2-performance in terms of linear-matrix inequalities (LMIs) and integral-quadartic constraints (IQCs). In particular for linear-time-varying parametric uncertainty and time delay uncertainty.
3) Feedback controller synthesis code using IQC, LMI and nonsmooth optimization methods. Modifications to proprietary Mathworks code are not released due to licensing issues, but are described in [1]
4) Simulation code for case study results presented in [1].
[1] doi:10.15480/882.17063
[2] doi:10.15480/882.17064
Subjects
European XFEL, Laser-Based Synchronization, Controller Design, Dynamic System Simulation
DDC Class
629.8: Control and Feedback Control Systems
Technical information
Tested with MATLAB R2025b, Yalmip R20250625, MOSEK 11.
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Name
Optimal Robust Distributed Control Synchronization Systems CODE.zip
Size
82.88 MB
Format
ZIP