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Mathematical linkage of units commitment and optimal dispatch of large grid power system
MATHEMATICAL
OF UNITS COMMITMENT AND LARGE GRID POWER SYSTEM
LINKAGE OF
OPTIMAL
DISPATCH
Denno
K.
New Jersey Institute New Jersey Newark,
of Technology 07102 U.S.A.
'bstract. This paper introduces mathematical model for Power generating inits commitments and optimization of economic power dispatch The in a large Interconnected multi-area grid power system. model incorporates the developed method by this author in previously published work of the calculation for the transmission losses through its matrix in the 6th reference into the optimization mechanism using the first and the frame, 2nd gradient methods in addition to the base point and participation factors methods.
A.
THE
NEW
MODEL
PARTICIPATION
OF
BASE
POINT
where
FACTORS METHOD IN
aF -.L=F
FRAME NO. 6
+F
iipi
api
i
(7)
This is expressed by: C. aP DC ap. I
apL api
(1)
MODELLING OF THE SECOND ORDER GRADIENT METHOD IN THE 6th REFERENCE FRAME With
in
(2)
6th
the
( 9 ) and frame
same for
constraint Lagrange
replacing
the
model presented in ( 2) matrix model expressed
as
expressed
function total
in
the
C"st matrix
will take below:
the
new
L Pf
=
/l-
api
= penalty
pf and
that
Pf
aFi =api=x
apl factor
of
plant
i ap2 (4)
I t I
B.
r%XXLLING OF THE ?IRST ORDER ap
GRADIENT METHOD IN THE 6th
_
REFERENCE FRAME perturbaion Lagrange
AF, function
Will t,
be
replaced
by
where,
the
txox+ xpLx the dependent
is
the
Lagrange
function
of
Lagrange
function
of
plant
\_I
where @
is the
objective
.'.Perturbational method
could
function
mode now
be
- r Pi-P,_PL
according modeled
as
to
thfs
L,-
@n + iPL"
the
nth
similarly
below:
is
the
plant. as
- Participation
in modeling and
the
method, the matrix model reference frame indicated
(6)
is 476
explicitly
secured
of First
the
Base
in the 6th in reference
since
Point
gradient
closed
(2) form of
477
MATHEMATICAL LINKAGE
solutions
are
already
power
established
grid
economic
in
terms
Pi, P
of
aPi j'api
aB,j aP.
a"d
1
the the
large
6th reference basic stand
will proceed and commiting power using methodology. conclusions being 1.
2.
frame point
grid would
that
system ensure
and
from
successfully for eco”omizi”g the dispatch of electric any working mathematical In this paper, the followi”R could be drawn from the work
The new model of base-point and part icipat ion factors method would accompl ish optimal economic dispatch a”d commitme”t in the 6th reference frame “ith the knowledge of the trhnhmiSsi0”
in
terms
transmission ivative with
4.
of
solutions
loss respect
power
a”,j
dispatch
carrying using the is establ
commitment
der cap
US i”R
the
gradient method is newly on reliable and secure of functional dependency
among the transmission loss matrix in the 6th reference frame, the first and second order partial derivatives of the [B] matrix with respect to the state of change wdll asdependency s .turces within
5.
Establishing
of any power source as between eny two power the entire grid system. the
basic
economic
power
dispatch and commit q ent model in the 6th reference frame, is the central phase for the characterization. and modelling of the entire grid system in the fir’st or the actual network design System that can be secured by reverse SYStem erence
representation is the actual
in the first design of the
power
E.,
ref
System”,
Communications 1974.
and
systems,
Identif lcat Frame”, and Engineer 1977.
Pergamon
Text
ational
Paterson,
W.,
vol.
““e
Press,
N.Y.
and
ion
Publishers,
on Electr
two.
11977.
z"d Sze, T. Engineering,
Mickle, Marlin, H. ation in Systems
W., opt Intext
imiz Educ
1972.
Podgnrski, A. S., "Three Dimensional Systems Modeling of HV Systems", IEEE Transact ions on Power Apparatus andsystems, ~.2899-2903, 1984. Rharat.
proceedings Application vol. II, Patel,
Denno,
aTI,+
Techniques
acity of any power source as wellas the secured functional dependency between any two power sources, and the model of fuel cost data of any sourcewithin the entire grid system. Mathematical linkage model for optimal second order set-up based information
Canadian
Conference,
A.
ical
Pntel ,
of
matrix, to the
Guile,
-
for
the its first variele
Power
‘“Power System Synthesis Denno, Khalil. from Solution of Opt imum Transmission Loss Coeff icie”ts”, IEEE Transactions Power Apparatus and Systems, 1973.
presented:
Mathematical linkage model dispatch and unit commitment first order gradient method
of
Power
and DY”=~=
“Steady-State an Integrated
of
System Denno, Khalil . “Power in the Power Flow Reference Journal of Applied Science i”g A, vol. 2, p. 141-153,
optimization
Solutions in closed mathematical form have been establishedfor the funftio “al dependency between any two power sources in the 6th reference frame in terms of their source capacitywithin the maximum and minimum limits, their fuel cost data and the no-load running This solution 1s unique and of costs. extreme significance for the complete” ess of this model.
ished
.
Khalil,
proceedings
i”
loss c”efficent matrix. the first order of change of the [B] matrix with respect to any power source. and with the established information for the functional dependence of every power source with respect to any other with in the entire grid system.
3.
,
Modeling
power
optimum
REFERENCES
CONCLUSIONS of
based on operation.
of
.Demo
Hodelling
system state
InLarge of the in Large P.
217-224,
Bhnr,lt_ and
Conference ing Socie Canada,
paper, No. b y,
Wiley
Systems”,
Symposium on Computer Scale Power Systems,
K.,
“Improved
Tie Power Flows Power Systems”, IEEE
Power
A79-459-9,
Heth for
B
E"R i"eer Vancouver,
1979.
Wood, Allen J. a"d Power Generation. John
imizalon
Power
1979.
Denno.
od of Modelllng Multi-Area Grid
“Opt
K.,
Scale
and
Wollenberg, Operation So"s,'1984.
8. and
F., Control,
OF UNITS COMMITMENT AND LARGE GRID POWER SYSTEM
LINKAGE OF
OPTIMAL
DISPATCH
Denno
K.
New Jersey Institute New Jersey Newark,
of Technology 07102 U.S.A.
'bstract. This paper introduces mathematical model for Power generating inits commitments and optimization of economic power dispatch The in a large Interconnected multi-area grid power system. model incorporates the developed method by this author in previously published work of the calculation for the transmission losses through its matrix in the 6th reference into the optimization mechanism using the first and the frame, 2nd gradient methods in addition to the base point and participation factors methods.
A.
THE
NEW
MODEL
PARTICIPATION
OF
BASE
POINT
where
FACTORS METHOD IN
aF -.L=F
FRAME NO. 6
+F
iipi
api
i
(7)
This is expressed by: C. aP DC ap. I
apL api
(1)
MODELLING OF THE SECOND ORDER GRADIENT METHOD IN THE 6th REFERENCE FRAME With
in
(2)
6th
the
( 9 ) and frame
same for
constraint Lagrange
replacing
the
model presented in ( 2) matrix model expressed
as
expressed
function total
in
the
C"st matrix
will take below:
the
new
L Pf
=
/l-
api
= penalty
pf and
that
Pf
aFi =api=x
apl factor
of
plant
i ap2 (4)
I t I
B.
r%XXLLING OF THE ?IRST ORDER ap
GRADIENT METHOD IN THE 6th
_
REFERENCE FRAME perturbaion Lagrange
AF, function
Will t,
be
replaced
by
where,
the
txox+ xpLx the dependent
is
the
Lagrange
function
of
Lagrange
function
of
plant
\_I
where @
is the
objective
.'.Perturbational method
could
function
mode now
be
- r Pi-P,_PL
according modeled
as
to
thfs
L,-
@n + iPL"
the
nth
similarly
below:
is
the
plant. as
- Participation
in modeling and
the
method, the matrix model reference frame indicated
(6)
is 476
explicitly
secured
of First
the
Base
in the 6th in reference
since
Point
gradient
closed
(2) form of
477
MATHEMATICAL LINKAGE
solutions
are
already
power
established
grid
economic
in
terms
Pi, P
of
aPi j'api
aB,j aP.
a"d
1
the the
large
6th reference basic stand
will proceed and commiting power using methodology. conclusions being 1.
2.
frame point
grid would
that
system ensure
and
from
successfully for eco”omizi”g the dispatch of electric any working mathematical In this paper, the followi”R could be drawn from the work
The new model of base-point and part icipat ion factors method would accompl ish optimal economic dispatch a”d commitme”t in the 6th reference frame “ith the knowledge of the trhnhmiSsi0”
in
terms
transmission ivative with
4.
of
solutions
loss respect
power
a”,j
dispatch
carrying using the is establ
commitment
der cap
US i”R
the
gradient method is newly on reliable and secure of functional dependency
among the transmission loss matrix in the 6th reference frame, the first and second order partial derivatives of the [B] matrix with respect to the state of change wdll asdependency s .turces within
5.
Establishing
of any power source as between eny two power the entire grid system. the
basic
economic
power
dispatch and commit q ent model in the 6th reference frame, is the central phase for the characterization. and modelling of the entire grid system in the fir’st or the actual network design System that can be secured by reverse SYStem erence
representation is the actual
in the first design of the
power
E.,
ref
System”,
Communications 1974.
and
systems,
Identif lcat Frame”, and Engineer 1977.
Pergamon
Text
ational
Paterson,
W.,
vol.
““e
Press,
N.Y.
and
ion
Publishers,
on Electr
two.
11977.
z"d Sze, T. Engineering,
Mickle, Marlin, H. ation in Systems
W., opt Intext
imiz Educ
1972.
Podgnrski, A. S., "Three Dimensional Systems Modeling of HV Systems", IEEE Transact ions on Power Apparatus andsystems, ~.2899-2903, 1984. Rharat.
proceedings Application vol. II, Patel,
Denno,
aTI,+
Techniques
acity of any power source as wellas the secured functional dependency between any two power sources, and the model of fuel cost data of any sourcewithin the entire grid system. Mathematical linkage model for optimal second order set-up based information
Canadian
Conference,
A.
ical
Pntel ,
of
matrix, to the
Guile,
-
for
the its first variele
Power
‘“Power System Synthesis Denno, Khalil. from Solution of Opt imum Transmission Loss Coeff icie”ts”, IEEE Transactions Power Apparatus and Systems, 1973.
presented:
Mathematical linkage model dispatch and unit commitment first order gradient method
of
Power
and DY”=~=
“Steady-State an Integrated
of
System Denno, Khalil . “Power in the Power Flow Reference Journal of Applied Science i”g A, vol. 2, p. 141-153,
optimization
Solutions in closed mathematical form have been establishedfor the funftio “al dependency between any two power sources in the 6th reference frame in terms of their source capacitywithin the maximum and minimum limits, their fuel cost data and the no-load running This solution 1s unique and of costs. extreme significance for the complete” ess of this model.
ished
.
Khalil,
proceedings
i”
loss c”efficent matrix. the first order of change of the [B] matrix with respect to any power source. and with the established information for the functional dependence of every power source with respect to any other with in the entire grid system.
3.
,
Modeling
power
optimum
REFERENCES
CONCLUSIONS of
based on operation.
of
.Demo
Hodelling
system state
InLarge of the in Large P.
217-224,
Bhnr,lt_ and
Conference ing Socie Canada,
paper, No. b y,
Wiley
Systems”,
Symposium on Computer Scale Power Systems,
K.,
“Improved
Tie Power Flows Power Systems”, IEEE
Power
A79-459-9,
Heth for
B
E"R i"eer Vancouver,
1979.
Wood, Allen J. a"d Power Generation. John
imizalon
Power
1979.
Denno.
od of Modelllng Multi-Area Grid
“Opt
K.,
Scale
and
Wollenberg, Operation So"s,'1984.
8. and
F., Control,