Building Model

Description: Motion Problem in a Building

This benchmark models the displacement of a multi-story building for example during an Earthquake. More details can be found in ^[1] and ^[2], ^[3].

Earthquake Model

Origin

This benchmark is part of the SLICOT Benchmark Examples for Model Reduction^[3].

Data

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

Here is Python code for loading the matrices ( $A$ is stored as a sparse matrix that is mostly full and $C$ is stored as an array of 8-bit unsigned integers):

import numpy as np
from scipy.io import loadmat

mat = loadmat('build.mat')
A = mat['A'].toarray()
B = mat['B']
C = mat['C'].astype(np.float_)

The $(A, B, C)$ represents a second-order system

\begin{aligned} \ddot{q} (t) + E_{s o} \dot{q} (t) + K_{s o} q (t) & = B_{s o} u (t), \\ y (t) & = C_{s o} \dot{q} (t), \end{aligned}

as

\begin{aligned} A & = (\begin{matrix} 0 & I \\ - K_{s o} & - E_{s o} \end{matrix}), \\ B & = (\begin{matrix} 0 \\ B_{s o} \end{matrix}), \\ C & = (\begin{matrix} 0 & C_{s o} \end{matrix}) \end{aligned}

Here is Python code for checking the structure and extracting the second-order matrices:

n = 48
n2 = n // 2

assert np.all(A[:n2, :n2] == 0)
assert np.all(A[:n2, n2:] == np.eye(n2))
assert np.all(B[:n2] == 0)
assert np.all(C[:, :n2] == 0)

Eso = -A[n2:, n2:]
Kso = -A[n2:, :n2]
Bso = B[n2:]
Cso = C[:, n2:]

Dimensions

First differential order

System structure:

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

System dimensions:

$A \in ℝ^{48 \times 48}$ , $B \in ℝ^{48 \times 1}$ , $C \in ℝ^{1 \times 48}$ .

Second differential order

System structure:

\begin{aligned} \ddot{x} (t) + E \dot{x} (t) + K x (t) & = B u (t) \\ y (t) & = C_{v} \dot{x} (t) \end{aligned}

System dimensions:

$E, K \in ℝ^{24 \times 24}$ , $B \in ℝ^{24 \times 1}$ , $C_{v} \in ℝ^{1 \times 24}$ .

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_build,
 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{morAntSG01,
 author =       {A.C. Antoulas, D.C. Sorensen and S. Gugercin},
 title =        {A survey of model reduction methods for large-scale systems},
 journal =      {Contemporary Mathematics},
 volume =       {280},
 pages =        {193--219},
 year =         {2001},
 doi =          {10.1090/conm/280}
}

References

↑ A.C. Antoulas, D.C. Sorensen and S. Gugercin. A survey of model reduction methods for large-scale systems. Contemporary Mathematics, 280: 193--219, 2001.
↑ Y. Chahlaoui, P. Van Dooren, A collection of Benchmark examples for model reduction of linear time invariant dynamical systems, Working Note 2002-2: 2002.
↑ ^3.0 ^3.1 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.

[antoulas01-1] A.C. Antoulas, D.C. Sorensen and S. Gugercin. A survey of model reduction methods for large-scale systems. Contemporary Mathematics, 280: 193--219, 2001.

[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.

[chahlaoui05-3] 3.0 ^3.1 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.

[1]

[2]

[3]