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Dynamic State Estimation of Power Generators
Presented by
Samson Yu
School of Electrical and Electronic Engineering (EECE),
University of Western Australia (UWA)
Future grids:
“A seamless, cost-effective electricity system, from generation to end-use, capable of meeting all clean energy demands and capacity requirements”
• Societal, economic and environmental.
0. Motivations
Future grids:
1. Scale-up of clean energy (renewables, natural gas, nuclear, fuel cells).
Worldwide: invested AUD $350 billion in clean energy 2015, higher than in fossil fuel power plants. DO GOOD and DO WELL.
AU: invested AUD $4.3 billion in clean energy 2016.AU RET: 23.5% of AU’s electricity generated by clean energy by year 2020.
Year 2015, 14.7%.
0. Motivations
Future grids:
2. Consumer participation and choice (distributed generation, electric vehicle, etc.).
3. Holistic design solutions (AC-DC transmission and distribution solutions, microgrids, and centralized-decentralized control).
4. Two-way flows of energy and information (Internet Of Thing)5. Reliability and security (cyber)
0. Motivations
Questions:
1. What are “dynamic states” of power generators?
2. Why do we want to estimate the dynamic states?
3. How can we perform the dynamic state estimation?
4. How can the estimated dynamic states be used?
0. Motivations
1. Dynamic states of power generators
Slower Dynamics
(All the generators)
Faster Dynamics
(Transmission and distribution network with all electrical loads)
𝑥 = 𝑓(𝑥, 𝑢) 0 = 𝑔(𝑥, 𝑢)
• We have a Differential Algebraic Equation (DAE) formulation of a power system.
𝑥 = 𝑓 𝑥, 𝑢 ,0 = 𝑔 𝑥, 𝑢 .
Examples:
1. Rotating power generatorsI. Synchronous generators
II. Asynchronous generators
2. Stationary power generatorsI. Fuel cells
II. Solar PVs
III. Nuclear power
1. Dynamic states of power generators
Synchronous generator
1. Dynamic states of power generators
Asynchronous generator
1. Dynamic states of power generators
Fuel cells (e.g., SOFC)
1. Dynamic states of power generators
Reason 1—Hard to directly measure.
Reason 2—Some states we want to control, and we need to know thembefore we can control them. (e.g., gas partial pressure of fuel cells).
Reason 3—More information may help us design a more effectivecontroller. (e.g., in DFIG knowledge of flux helps with rotor currentregulation).
2. Estimating the dynamic states—Reason
S. Yu, T. Fernando, Tat Kei Chau and H. H.-C. Iu, “Voltage control strategies for
solid oxide fuel cell energy system connected to complex power grids using
dynamic state estimation and STATCOM,” IEEE Transactions on Power Systems,
DOI: 10.1109/TPWRS.2016.2615075. 04-Oct-2016
S. Yu, T. Fernando, and H. H.-C. Iu, “Dynamic State Estimation Based Control
strategy for DFIG wind turbine connected to complex power systems,” IEEE
Transactions on Power Systems, vol.32, no. 2, p.p. 1272-1281.
• Internal dynamic states are hard to acquire directly—
use the knowns to estimate the unknowns.
where 𝜖 is measurable input vector and 𝜁 is measureable outputvector.
• In a power system, voltages, currents and their phase angles aremeasureable signals, and can be measured by PMUs.
3. Estimating the dynamic states—How
𝑥 = Υ 𝑥, 𝜖 ,𝜁 = Ψ 𝑥, 𝜖 ,
𝑥 = 𝑓 𝑥, 𝑢 ,0 = 𝑔 𝑥, 𝑢 ,
• Use different mathematical methods to perform dynamic stateestimation. So far, we have developed several algorithms:
• State and Functional Observers to acquire internal dynamic states ofsynchronous generators.
• Extended Kalman Filter for synchronous, asynchronous and stationarypower generators.
• Unscented Kalman Filter for synchronous, asynchronous and stationarypower generators.
• Particle Filter for synchronous, asynchronous and stationary powergenerators.
ISSUES:
Model validation, model discretization, probabilistic model, PMUmeasurement noises, transmission time delays, etc.
3. Estimating the dynamic states—How
The estimated dynamic states of power generators provide moreinformation of the operating conditions, with which we could developbetter control strategies to achieve a more favorable control performance.
4. Estimating the dynamic states—Use
IEEE Transactions on Power Systems
1. FO-based LFC approach
System
Control Signal
4. Estimating the dynamic states—Use 1. FO-based LFC scheme
Schematic of the IEEE standard (New England) 39-bus test system studied
Disturbances:
Case 1: An increase in load demands on busbar 1, 12, 24.Case 2: An decrease in load demands on busbar 7, 21,24.
4. Estimating the dynamic states—Use 1. FO-based LFC scheme
Important simulation results
4. Estimating the dynamic states—Use
IEEE Transactions on Power Systems
2. DSE-based DFIG control strategy
IEEE Transactions on Power Systems
4. Estimating the dynamic states—Use
2. DSE-based DFIG control scheme
Schematic of the IEEE standard (New England) 39-bus test system integrated with wind turbine power generation system
Disturbance (fault):
Transmission line between bus 21 and 22 is disconnected.
4. Estimating the dynamic states—Use
Simulation results of DSE
2. DSE-based DFIG control scheme
Simulation results of DSE-based control
4. Estimating the dynamic states—Use
3. DSE-based control strategies for solid oxide fuel cell power plant connected to a complex power grid.
4. DSE-based sliding mode control strategies for wind turbine system.
5. DSE-based sliding mode control strategies for traditional power generators, regulating busbar frequencies and voltage magnitudes.
6. DSE-based frequency restoration strategy for solar PV farm connected to power grids.
…
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