Abstract
In this talk a full nonlinear model for the power network in port–Hamiltonian framework is derived to study its stability properties. For this we use the modularity approach i.e., we first derive the models of individual components
in power network as port-Hamiltonian systems
and then we combine all the component models using power-preserving interconnections to give a global port Hamiltonian model of the power network. In this way we obtain a structure-preserving disaggregated model that basically preserves the original topology of the network,
which will subsequently pave the way for energy
based analysis.
in power network as port-Hamiltonian systems
and then we combine all the component models using power-preserving interconnections to give a global port Hamiltonian model of the power network. In this way we obtain a structure-preserving disaggregated model that basically preserves the original topology of the network,
which will subsequently pave the way for energy
based analysis.
| Original language | English |
|---|---|
| Pages | 140 |
| Number of pages | 1 |
| Publication status | Published - 27-Mar-2012 |
| Event | 31th Benelux Meeting on Systems and Control - Hijen/Nijmegen, Netherlands Duration: 27-Mar-2012 → 29-Mar-2012 |
Conference
| Conference | 31th Benelux Meeting on Systems and Control |
|---|---|
| Country/Territory | Netherlands |
| City | Hijen/Nijmegen |
| Period | 27/03/2012 → 29/03/2012 |
Keywords
- Power Networks
- Port Hamiltonian modeling