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Transcript
ChE 391, Spring 2012 Power Systems Control 1 © Alexis Kwasinski, 2012 Introduction • Control variables in dc power systems • Voltage v (t ) V • Control variables in ac power systems: • Voltage amplitude • Phase: (angular) frequency and angle v(t ) V cos(t V ) • Phasors • Used to represent ac signals in single-frequency systems through a fixed vector in the complex plane. Imaginary v(t ) Real(Ve jV e jt ) V V V V 2 V © Alexis Kwasinski, 2012 Real Introduction • Power in ac systems • Instantaneous power: p(t ) v(t )i(t ) V cos(t V ) I cos(t I ) p(t ) v(t )i(t ) VI cos(V I ) cos(2t V I ) 2 Constant part • Real power: related with irreversible energy exchanges (work or dissipated heat). That is, real power represents energy that leaves or enters the electrical circuit under analysis per unit of time, so the energy exchanges occur between the circuit and its environment. P VI V I cos(V I ) cos(V I ) 2 2 2 P VRMS I RMS cos( ) 3 © Alexis Kwasinski, 2012 V I Introduction • Power in ac systems • Reactive power: related with reversible energy exchanges. That is, reactive power represents energy that is exchanged between the circuit and electric or magnetic fields in a cyclic way. During half of the cycle energy from the sources are used to build electric fields (charge capacitors) or magnetic fields (charge machines) and during the other half cycle exactly the same energy is returned to the source(s). Q VRMS I RMS sin( ) e.g. in an inductor: P0 VI I ( L) I LI 2 2 Q sin(90) 2 2 2 T 4 © Alexis Kwasinski, 2012 Introduction • Power in ac systems • Complex power • Notice that P 1 1 1 Real(VI* ) Real VI V I Real VI 2 2 2 • and that 1 1 1 Q Imaginary(VI* ) Imaginary VI V I Imaginary VI 2 2 2 • So a magnitude called complex power S is defined as S VI* VRMS I RMS (cos j sin ) 2 S I RMS ( R jX ) Q > 0 (inductive load) Q = 0 (resistive load) Q < 0 (capacitive load) • Power factor (in power systems with one frequency) is defined as • It provides an idea of how efficient is the P P p. f . cos process of using (and generating) electrical S P2 Q2 power in ac circuits: 5 © Alexis Kwasinski, 2012 Introduction • Synchronous generators • Input: • Mechanical power applied to the rotor shaft • Field excitation to create a magnetic field constant in magnitude and that rotates with the rotor. • Output: • P and Q (electric signal with a given frequency for v and i) Field Excitation 6 Q © Alexis Kwasinski, 2012 Introduction • Synchronous generators • Open circuit voltage: e NS d dt ERMS 4.44 K d K p fN S E N S 1 NR IR l A E Magneto-motive force (mmf) IR 7 © Alexis Kwasinski, 2012 Synchronous generators control • Effect of varying field excitation in synchronous generators: • When loaded there are two sources of excitation: • ac current in armature (stator) • dc current in field winding (rotor) • If the field current is enough to generate the necessary mmf, then no magnetizing current is necessary in the armature and the generator operates at unity power factor (Q = 0). • If the field current is not enough to generate the necessary mmf, then the armature needs to provide the additional mmf through a magnetizing current. Hence, it operates at an inductive power factor and it is said to be underexcited. • If the field current is more than enough to generate the necessary mmf, then the armature needs to provide an opposing mmf through a magnetizing current of opposing phase. Hence, it operates at a capacitive power factor and it is said to be overexcited. 8 © Alexis Kwasinski, 2012 Synchronous generators control • Relationship between reactive power and field excitation http://baldevchaudhary.blogspot.co m/2009/11/what-are-v-andinverted-v-curves.html • The frequency depends on the rotor’s speed. So frequency is controlled through the mechanical power. • Pmec is increased to increase f • Pmec is decreased to decrease f Field Excitation 9 © Alexis Kwasinski, 2012 Q Voltage and frequency control • The simplified equivalent circuit for a generator and its output equation is: Q, pE LOAD • Assumption: during short circuits or load changes E is constant • V is the output (terminal) voltage pe E.V E.V sin X X Electric power provided to the load XQ E V E 10 © Alexis Kwasinski, 2012 Voltage and frequency control • It can be found that d (t ) syn dt • Generator’s angular frequency • Grid’s angular frequency • Ideally, the electrical power equals the mechanical input power. The generator’s frequency depends dynamically on δ which, in turn, depends on the electrical power (=input mechanical power). So by changing the mechanical power, we can dynamically change the frequency. • Likewise, the reactive power controls the output voltage of the generator. When the reactive power increases the output voltage decreases. 11 © Alexis Kwasinski, 2012 Voltage and frequency control • Droop control • It is an autonomous approach for controlling frequency and voltage amplitude of the generator and, eventually, the grid. • It takes advantage that real power controls frequency and that reactive power controls voltage f f0 kP ( P P0 ) V V0 kQ (Q Q0 ) V f f0 V0 P0 12 P © Alexis Kwasinski, 2012 Q0 Q Voltage and frequency control • Droop control •Then a simple (e.g. PI) controller can be implemented. It considers a reference voltage and a reference frequency: •If the output voltage is different, the field excitation is changed (and, thus, changes Q and then V). •If the frequency is different, the prime mover torque is changed (and thus, changes P and then f). V V0 kQ (Q Q0 ) f f0 kP ( P P0 ) V f f0 V0 P0 13 P © Alexis Kwasinski, 2012 Q0 Q Voltage and frequency control • Operation of a generator connected to a large grid • A large grid is seen as an infinite power bus. That is, it is like a generator in which • Changes in real power do not cause changes in frequency • Changes in reactive power do not originate changes in voltage • Its droop control curves are horizontal lines V f P 14 © Alexis Kwasinski, 2012 Q Voltage and frequency control • Operator of a generator connected to a large grid • When connected to the grid, the voltage amplitude and frequency is set by the grid. • In order to synchronize the oncoming generator, its frequency needs to be slightly higher than that of the grid, but all other variables need to be the same. V f f gen VG fG P 15 © Alexis Kwasinski, 2012 Q Voltage and frequency control • Operator of a generator connected to a large grid • After the generator is paralleled to the grid then its output frequency and voltage will remain fixed and equal to the grid’s frequency and voltage, respectively. • Output power is controlled by attempting a change in frequency by controlling the prime mover’s torque. By “commanding” a decrease in frequency, the output power will increase. • A similar approach is followed with reactive power control, by controlling field excitation in an attempt to change output voltage. Higher commanded frequencies f Higher power output Operating frequency No load droop line P1 16 P2 © Alexis Kwasinski, 2012 P Stability • From mechanics Moment of inertia d 2 m J Tm (t ) Te (t ) 2 dt angular acceleration mechanical torque electrical torque • If a synchronous reference frame is considered then m (t ) m,synt m (t ) Mechanical equivalent of its electrical homologous variable Synchronous speed # poles x xm 2 • Swing equation: d 2 (t ) p.u (t ) pm, p.u. (t ) pe, p.u (t ) 2 syn dt 2H where “p.u.” indicates per unit and H 0.5 J m2 ,syn Srated , m,syn p.u (t ) m (t ) • So if pe pm (t ) decreases and if pe pm (t ) increases 17 © Alexis Kwasinski, 2012 Stability • Equal area criterion: Assume that the mechanical power suddenly increases. 4) Because of rotor inertia increases up to here 2) The rotor accelerates 3) The rotor decelerates pe pm pe pm 5) After oscillating, δ(t) comes to a rest at (t ) 1 1) Initial condition pe E.V sin X • The equal area criterion says that A1 = A2 • If 2 3 the generator looses stability because pe pm and the generator continues to accelerate. • Sudden changes in pm are not common. But changes in pe do happen. 18 © Alexis Kwasinski, 2012 Stability • Equal area criterion during faults a most critical case: a fault. Both areas are equal pe pm 4) Because of rotor inertia (t ) increases up to here pe 1) Initial condition E.V sin X pe pm 3) Fault is cleared here 2) During the fault pe = 0 • After reaching 2 δ(t) will oscillate until losses and the load damp oscillations and (t ) 0 • If 2 3 the generator looses stability because pe pm and the generator continues to accelerate. 19 © Alexis Kwasinski, 2012 A brief summary • In ac systems, large machine inertia helps to maintain stability. • Since frequency needs to be regulated at a precise value, imbalances between electric and mechanical power may make the frequency to change. In order to avoid this issue, mechanical power applied to the generator rotor must follow load changes. If the mechanical power cannot follow the load alone (e.g. due to machine’s inertia), energy storage must be used to compensate for the difference. This is a situation often found in microgrids. • Reactive power is used to regulate voltage. • Droop control is an effective autonomous controller. 20 © Alexis Kwasinski, 2012 Some additional comments • Large machine’s inertia contributes to system stability but makes it difficult to follow fast changing loads. • At every time instant the goal is power generation = load + losses. • Hence a combination of generation technologies are used to achieve good stability performance while still be able to follow the load. • A dispatch center solves the power flow equations and commands the generation units so generation = load + losses in an optimally economical and technically feasible way (economic dispatch problem). Summer day Winter day 1.1 1.1 Peaking plants (gas turbines and some diesel 1.0 1.0 0.9 0.9 0.8 0.8 Load following plants (gas turbines and some hydro and nuclear) 0.7 0.7 0.6 0.6 0.5 0.5 0 21 Base load plants (coalfired and most nuclear plants) 3 6 9 12 15 18 21 24 0 3 6 © Alexis Kwasinski, 2012 9 12 15 18 21 24 Some additional comments • Although not explicitly mentioned before, the analysis considered some implicit assumptions: • single phase equivalent for the circuits • No harmonics • Linear loads and components (e.g. no saturation in machines) • Ideal lumped components • The fast average frequency is the same everywhere in the grid. • The voltage changes along the grid. Hence, then voltage is compensated everywhere along the grid with capacitors and voltage compensators (autotransformers) and other means (e.g. static VAR compensators). • Although it seems that control of a dc grid is simpler, the need for power electronic interfaces create nonlinear instantaneous constantpower loads that have a de-stabilizing effect on the dc grid. Moreover, autonomous controllers are more difficult to implement because the only static existing variable is bus voltages. 22 © Alexis Kwasinski, 2012 One grid or many grids? • US: The same nominal frequency but 3 main grids • Japan: Two different nominal frequencies and 3 grids Tie Source: NPR Source: Tosaka 23 © Alexis Kwasinski, 2012 Examples Slow Frequency Variation Wednesday, November 7, 2007, 4:15 PM Texas 0.1Hz 8 minutes 24 © Alexis Kwasinski, 2012 Examples Large Generator Trip Tuesday, November 13, 2007, 4:19 PM Texas 0.16Hz 8 minutes 25 © Alexis Kwasinski, 2012 Examples Unusual Wind-Related Event? Sunday, May 13, 2007, 3:11am 8 minutes • Intermittent (non-dispatchable) generation sources, such as wind generators or PV modules) may have a severe negative effect on grid’s stability if they are not properly controlled. 26 © Alexis Kwasinski, 2012 Examples Multiple Generator Trips Saturday, August 25, 2007, 3:32 AM California 0.10Hz 8 minutes 27 © Alexis Kwasinski, 2012 Examples Onset of Rotating Blackout Monday, April 17, 2006, 4pm (Unusually hot day, and many generators out for maintenance) Texas 0.2Hz Insufficient Spinning Reserve Generator Trip Generator Trip Voluntary load shedding begins 8 minutes Stage 1 of automatic load shedding (5%) kicks in at 59.7Hz 28 © Alexis Kwasinski, 2012