Difference between revisions of "Power system examples"

Revision as of 13:37, 29 April 2013

1 Description

These first order systems are given in generalized state space form

$E\dot{x}(t)=A x(t)+B u(t), \quad y(t)=Cx(t)+Du(t),\quad E,A\in\mathbb{R}^{n\times n},~B\in\mathbb{R}^{n\times m},~C\in\mathbb{R}^{p\times n},~D\in\mathbb{R}^{p\times m}$

and originated at CEPEL for simulating large power systems.

They come in different sizes and variants, including both SISO and MIMO systems having regular or singular $E$ matrices. In the latter case the DAEs are of index 1 and using simple row and column permutations, $E,A$ can be brought into the form

$E=\left[ \begin{array}{cc}I_{n_f}&0\\0&0\end{array}\right],\quad A=\left[ \begin{array}{cc}A_{11}&A_{12}\\A_{21}&A_{22}\end{array}\right],$

where $n_f$ denotes the number of finite eigenvalues in $\Lambda(A,E)$ and $A_{22}\in\mathbb{R}^{n-n_f\times n-n_f}$ is regular. A complete overview over these systems can be found in table below. The power systems served as benchmark examples for Dominant Pole based Modal Truncation^[1]^[2]^[3]^[4]^[5] and for a special adaption^[6] of Balanced Truncation for the index-1 DAE systems.

2 Data

The table below lists the charateristics of all power systems. The files can be downloadet at https://sites.google.com/site/rommes/software.

Name	$n$	$m$	$p$	Type
New England	66	1	1	ODE
BIPS/97	13251	1	1	DAE
BIPS/1997	13250	1	1	DAE
BIPS/2007	21476	1	1	DAE
BIPS/97,MIMO8	13309	8	8	DAE
BIPS/97,MIMO28	13251	28	28	DAE
BIPS/97,MIMO46	13250	46	46	DAE
Juba5723	40337	2	1	DAE
Bauru5727	40366	2	2	DAE
zeros_nopss	13296	46	46	DAE
xingo6u	20738	1	6	DAE
nopss	11685	1	1	DAE
bips98_606	7135	4	4	DAE
bips98_1142	9735	4	4	DAE
bips98_1450	11305	4	4	DAE
bips07_1693	13275	4	4	DAE
bips07_1998	15066	4	4	DAE
bips07_2476	16861	4	4	DAE
bips07_3078	21128	4	4	DAE
PI Sections 20-80				ODE

3 References

<references> ^[1]

^[2]

^[3]

^[4]

^[6]

^[5]

4 Contact

Joost Rommes User:kuerschner

↑ ^1.0 ^1.1 N. Martins, L. Lima, and H. Pinto, "Computing dominant poles of power system transfer functions", IEEE Transactions on Power Systems, vol.11, no.1, pp.162-170, 1996
↑ ^2.0 ^2.1 J. Rommes and N. Martins, "Efficient computation of transfer function dominant poles using subspace acceleration", IEEE Transactions on Power Systems, vol.21, no.3, pp.1218-1226, 2006
↑ ^3.0 ^3.1 J. Rommes and N. Martins, "Efficient computation of multivariable transfer function dominant poles using subspace acceleration", IEEE Transactions on Power Systems, vol.21, no.4, pp.1471-1483, 2006
↑ ^4.0 ^4.1 J. Rommes, "Methods for eigenvalue problems with applications in model order reduction", Ph.D. dissertation, Universiteit Utrecht, 2007.
↑ ^5.0 ^5.1 P. Kürschner, "Two-sided eigenvalue methods for modal approximation”, Master’s thesis, Chemnitz University of Technology, Department of Mathematics, Germany, 2010.
↑ ^6.0 ^6.1 F. Freitas, J. Rommes, and N. Martins, "Gramian-based reduction method applied to large sparse power system descriptor models" IEEE Transactions on Power Systems, vol. 23, no. 3, pp. 1258-1270, 2008.

[MarLP96-1] 1.0 ^1.1 N. Martins, L. Lima, and H. Pinto, "Computing dominant poles of power system transfer functions", IEEE Transactions on Power Systems, vol.11, no.1, pp.162-170, 1996

[RomM06a-2] 2.0 ^2.1 J. Rommes and N. Martins, "Efficient computation of transfer function dominant poles using subspace acceleration", IEEE Transactions on Power Systems, vol.21, no.3, pp.1218-1226, 2006

[RomM06b-3] 3.0 ^3.1 J. Rommes and N. Martins, "Efficient computation of multivariable transfer function dominant poles using subspace acceleration", IEEE Transactions on Power Systems, vol.21, no.4, pp.1471-1483, 2006

[Rom07-4] 4.0 ^4.1 J. Rommes, "Methods for eigenvalue problems with applications in model order reduction", Ph.D. dissertation, Universiteit Utrecht, 2007.

[Kue10-5] 5.0 ^5.1 P. Kürschner, "Two-sided eigenvalue methods for modal approximation”, Master’s thesis, Chemnitz University of Technology, Department of Mathematics, Germany, 2010.

[FreRM08-6] 6.0 ^6.1 F. Freitas, J. Rommes, and N. Martins, "Gramian-based reduction method applied to large sparse power system descriptor models" IEEE Transactions on Power Systems, vol. 23, no. 3, pp. 1258-1270, 2008.

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