Penzl's FOM

Penzl's FOM
Background
Benchmark ID	penzlFOM_n1006m1q1
Category	slicot
System-Class	LTI-FOS
Parameters
nstates	1006
ninputs	1
noutputs	1
nparameters	0
components	A, B, C
Copyright
License	NA
Creator	User:Himpe
Editor	User:Himpe User:Yue
Location
NA

Description

This benchmark is an artificial example system of order $1006$ from ^[1] also listed in ^[2]. It has long been regarded as a standard "full order model" (FOM) for testing new methods.

The benchmark system consists of the following system components:

$\begin{array}{rcl} A & = & (\begin{matrix} A_{1} \\ A_{2} \\ A_{3} \\ A_{4} \end{matrix}), \\ A_{1} & = & (\begin{matrix} - 1 & 100 \\ - 100 & - 1 \end{matrix}), A_{2} = (\begin{matrix} - 1 & 200 \\ - 200 & - 1 \end{matrix}), A_{3} = (\begin{matrix} - 1 & 400 \\ - 400 & - 1 \end{matrix}), A_{4} = (\begin{matrix} - 1 \\ - 2 \\ ⋱ \\ - 1000 \end{matrix}), \\ B & = & {(\begin{matrix} 10 & 10 & 10 & 10 & 10 & 10 & 1 & \dots & 1 \end{matrix})}^{T}, \\ C & = & B^{T} . \end{array}$

This system is a theoretical construct, but features a non-smooth Bode plot with three spikes.

MIMO Variant

In ^[3] a MIMO variant of this benchmark is utilized by adding random vectors to $B$ and $C$ .

Parametric Variant

In ^[4], a parametric variant of this benchmark is formulated by redefining $A_{1} = (\begin{matrix} - 1 & p \\ - p & - 1 \end{matrix}) .$

Origin

This benchmark is part of the SLICOT Benchmark Examples for Model Reduction^[5].

Data

The system matrices $A$ , $B$ , $C$ are available from the SLICOT benchmarks page: fom.zip and are stored as MATLAB .mat file.

Dimensions

System structure:

\begin{array}{rcl} \dot{x} (t) & = & A x (t) + B u (t) \\ y (t) & = & C x (t) \end{array}

System dimensions:

$A \in ℝ^{1006 \times 1006}$ , $B \in ℝ^{1006 \times 1}$ , $C \in ℝ^{1 \times 1006}$ ,

Citation

To cite this benchmark, use the following references:

For the benchmark itself and its data:

Niconet e.V., SLICOT - Subroutine Library in Systems and Control Theory, http://www.slicot.org

@MANUAL{slicot_fom,
 title =        {{SLICOT} - Subroutine Library in Systems and Control Theory},
 organization = {Niconet e.V.}
 address =      {\url{http://www.slicot.org}},
 key =          {SLICOT}
}

For the background on the benchmark:

@ARTICLE{morPen06,
 author =       {T. Penzl},
 title =        {Algorithms for Model Reduction of Large Dynamical Systems},
 journal =      {Linear Algebra and its Application},
 volume =       {415},
 number =       {2--3},
 pages =        {322--343},
 year =         {2006},
 doi =          {10.1016/j.laa.2006.01.007}
}

References

↑ T. Penzl. Algorithms for Model Reduction of Large Dynamical Systems. Linear Algebra and its Application 415(2--3): 322--343, 2006.
↑ Y. Chahlaoui, P. Van Dooren, A collection of Benchmark examples for model reduction of linear time invariant dynamical systems, Working Note 2002-2: 2002.
↑ M. Heyouni, K. Jbilou, A. Messaoudi, K. Tabaa. Model Reduction in Large-Scale MIMO Dynamical Systems via the Block Lanczos Method. Computational & Applied Mathematics 27(11): 211--236, 2008.
↑ A. C. Ionita,A. C. Antoulas, Data-Driven Parametrized Model Reduction in the Loewner Framework, SIAM J. Sci. Comput. 36(3): A984–A1007, 2014.
↑ Y. Chahlaoui, P. Van Dooren, Benchmark Examples for Model Reduction of Linear Time-Invariant Dynamical Systems, Dimension Reduction of Large-Scale Systems, Lecture Notes in Computational Science and Engineering, vol 45: 379--392, 2005.

[penzl06-1] T. Penzl. Algorithms for Model Reduction of Large Dynamical Systems. Linear Algebra and its Application 415(2--3): 322--343, 2006.

[chahlaoui02-2] Y. Chahlaoui, P. Van Dooren, A collection of Benchmark examples for model reduction of linear time invariant dynamical systems, Working Note 2002-2: 2002.

[heyouni08-3] M. Heyouni, K. Jbilou, A. Messaoudi, K. Tabaa. Model Reduction in Large-Scale MIMO Dynamical Systems via the Block Lanczos Method. Computational & Applied Mathematics 27(11): 211--236, 2008.

[Ionita14-4] A. C. Ionita,A. C. Antoulas, Data-Driven Parametrized Model Reduction in the Loewner Framework, SIAM J. Sci. Comput. 36(3): A984–A1007, 2014.

[chahlaoui05-5] Y. Chahlaoui, P. Van Dooren, Benchmark Examples for Model Reduction of Linear Time-Invariant Dynamical Systems, Dimension Reduction of Large-Scale Systems, Lecture Notes in Computational Science and Engineering, vol 45: 379--392, 2005.

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