Please use this identifier to cite or link to this item: http://dx.doi.org/10.14279/depositonce-14658
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Main Title: Qualitative Stability and Synchronicity Analysis of Power Network Models in Port-Hamiltonian Form
Author(s): Mehrmann, Volker
Morandin, Riccardo
Olmi, Simona
Schöll, Eckehard
Type: Research Paper
URI: https://depositonce.tu-berlin.de/handle/11303/15885
http://dx.doi.org/10.14279/depositonce-14658
License: http://rightsstatements.org/vocab/InC/1.0/
Abstract: In view of highly decentralized and diversified power generation concepts, in particular with renewable energies such as wind and solar power, the analysis and control of the stability and the synchronization of power networks is an important topic that requires different levels of modeling detail for different tasks. A frequently used qualitative approach relies on simplified nonlinear network models like the Kuramoto model. Although based on basic physical principles, the usual formulation in form of a system of coupled ordinary differential equations is not always adequate. We present a new energy-based formulation of the Kuramoto model as port-Hamiltonian system of differential-algebraic equations. This leads to a very robust representation of the system with respect to disturbances, it encodes the underlying physics, such as the dissipation inequality or the deviation from synchronicity, directly in the structure of the equations, it explicitly displays all possible constraints and allows for robust simulation methods. Due to its systematic energy based formulation the model class allows easy extension, when further effects have to be considered, higher fidelity is needed for qualitative analysis, or the system needs to be coupled in a robust way to other networks. We demonstrate the advantages of the modified modeling approach with analytic results and numerical experiments.
Subject(s): port-Hamiltonian system
descriptor system
power system
Kuramoto model
differential-algebraic equation
passivity
stability
synchronicity
order parameter
Issue Date: 22-Dec-2017
Date Available: 17-Dec-2021
Language Code: en
DDC Class: 510 Mathematik
MSC 2000: 34D30 Structural stability and analogous concepts
34C15 Nonlinear oscillations, coupled oscillators
Series: Preprint-Reihe des Instituts für Mathematik, Technische Universität Berlin
Series Number: 2017, 13
ISSN: 2197-8085
TU Affiliation(s): Fak. 2 Mathematik und Naturwissenschaften » Inst. Mathematik
Appears in Collections:Technische Universität Berlin » Publications

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