This example shows how to use the Reduce Model Order task in the Live Editor to generate code for performing model reduction by balanced truncation, mode selection, and pole-zero simplification. The **Reduce Model Order** task lets you interactively compute reduced-order approximations of high-order models while preserving model characteristics that are important to your application.

Open this example to see a preconfigured script containing the **Reduce Model Order** task. For more information about Live Editor tasks generally, see Add Interactive Tasks to a Live Script (MATLAB).

In the Live Editor, load the model you want to reduce into the MATLAB® workspace.

load build G size(G)

State-space model with 1 outputs, 1 inputs, and 48 states.

The LTI model `G`

is a state-space model with 48 states. You discard some of these states while preserving relevant dynamics. To experiment with reducing the model, open the **Reduce Model Order** Live Editor task. On the **Live Editor** tab, select **Task** > **Reduce Model Order**. This action inserts the task into your script.

Balanced truncation computes a lower-order approximation of your model by removing states with relatively small energy contributions. For more information about balanced truncation, see Balanced Truncation Model Reduction.

To generate code for balanced truncation in the **Reduce Model Order** task, in select `G`

as the model to reduce. Specify `Balanced Truncation`

as the **Method**.

Specify the target **Reduced Order** of the reduced model. You can use the *Hankel singular-value plot* to help select a target order. This plot visualizes the relative energy contribution of each state in the original model. The task discards states with lower energy than the state you select in this plot.

The response plot shows the Bode plot of the original model and the reduced-order model. Experiment with different reduced-order models by selecting different orders on the Hankel singular-value plot, using the response plot to observe how the reduced-order model changes. (To see the absolute or relative error between the original and reduced model, use the **Model Response** menu.)

Select the smallest model order that adequately preserves the dynamics that are important to your application. If you are only interested in dynamics in a specific frequency range, you can restrict the computation of energy contributions to that range. To do, select **Frequency Range**. Then, enter the minimum and maximum frequencies or specify the range using the vertical sliders on the response plot. (Selecting **Frequency Range** clears the **Preserve DC Gain** option, because 0 rad/s is not within the default frequency range.)

The task generates the code to compute the specified reduced model. To see the generated code, click at the bottom of the task. The task expands to show the generated code. For balanced truncation, **Reduce Model Order** uses `balred`

with options specified by `balredOptions`

. (To include code that produces a response plot, in the **Output Plot** menu, select the response you want.)

By default, the generated code uses `sysReduced`

as the name of the output variable. To specify a different output variable name, enter a new name in the summary line at the top of the task.

The task updates the generated code to reflect the new variable, and a reduced-order state-space model appears in the MATLAB® workspace with the new name.

You can use the reduced-order model in the MATLAB workspace in the same way you use any other LTI model for analysis and control design. For this example, compare the reduced model responses to a reduced-order model created using a different model-reduction method, *mode selection*. Mode selection reduces the model by discarding dynamics that fall outside a frequency region you specify.

Change the name of the output variable to `G_mr`

so you do not overwrite the model you created using balanced truncation. Then, set the reduction method to `Mode Selection`

. Use the vertical sliders on the plot to choose the frequency range within which to preserve dynamics, or enter the frequency range in **Cutoff Frequency**.

For mode selection, **Reduce Model Order** generates code that uses `freqsep`

. You can observe which poles and zeroes are eliminated from the reduced-order model by adding a pole-zero plot. To do so, in the **Output Plot** menu, select `Pole-Zero`

. This selection generates a plot that shows the poles and zeros of both the original and reduced model. It also adds the code for creating that plot to the generated code.

Pole-zero simplification reduces the order of your model exactly by canceling pole-zero pairs or eliminating states that have no effect on the overall model response. Pole-zero pairs can be introduced, for example, when you construct closed-loop architectures. Normal small errors associated with numerical computation can convert such canceling pairs to near-canceling pairs. Removing these states preserves the model response characteristics while simplifying analysis and control design.

The Pole-Zero Simplification method of **Reduce Model Order** automatically eliminates:

Canceling or near-canceling pole-zero pairs from transfer functions

Unobservable or uncontrollable states from state-space models

States that are structurally disconnected from the inputs or outputs

Change the name of the output variable to `G_pz`

so you do not overwrite the model you created using the other methods. Then, set the reduction method to `Pole-Zero Simplification`

. Use the **Tolerance** parameter to adjust how close to canceling pole-zero pairs must be to be eliminated. Move the slider toward **More** to cancel more pole-zero pairs, reducing the model to a smaller order. In **Output Plot**, select `Pole-Zero`

and use the plot to observe which poles and zeros are eliminated from the reduced model.

The **Reduce Model Order** task creates the reduced-order models in the MATLAB workspace automatically. You can use the models for further analysis or control design in the same way you use any other LTI model. For instance, compare the frequency responses of the original and all reduced-order models on one plot.

bode(G,G_bt,G_mr,G_pz,{0.1,1000}) legend