Tunable Generalized LTI models represent systems having both fixed and tunable (or parametric) coefficients.
You can use tunable Generalized LTI models to:
Model a tunable (or parametric) component of a control system, such as a tunable low-pass filter.
Model a control system that contains both:
Fixed components, such as plant dynamics and sensor dynamics
Tunable components, such as filters and compensators
You can use tunable Generalized LTI models for parameter studies. For an example, see Study Parameter Variation by Sampling Tunable Model.
If you have Robust Control Toolbox™ software, you can use
tunable Generalized LTI models for tuning fixed control structures
using tuning commands such as
See Robust Control Toolbox documentation:
Control System Toolbox™ includes tunable components with predefined structure called Control Design Blocks. You can use tunable Control Design Blocks to model any tunable component that fits one of the predefined structures.
To create tunable components with a specific custom structure that is not covered by the Control Design Blocks:
For examples of creating such custom tunable components, see:
To construct a tunable Generalized LTI model representing a control system with both fixed and tunable components:
Model the nontunable components of your system using Numeric LTI models.
Model each tunable component using Control Design Blocks or expressions involving such blocks. See Modeling Tunable Components.
The resulting model is:
genss model, if none of the
nontunable components is a frequency response data model (for example,
genfrd model, if the nontunable
component is a
For an example of constructing a
of a control system with both fixed and tunable components, see Control System with Tunable Components.
A Generalized model separately stores the numeric and parametric portions of the model by structuring the model in Standard Form, as shown in the following illustration.
w and z represent the inputs and outputs of the Generalized model.
H represents all portions of the Generalized model that have fixed (non-parametric) coefficients. H is:
A state-space (
ss) model, for
A frequency response data (
A matrix, for
B represents the parametric components of
the Generalized model, which are the Control Design Blocks B1, . . . , BN. The
of the Generalized model stores a list of the names of these blocks.
If the Generalized model has blocks that occur multiple times in B1, . . . , BN, these are
only listed once in the
To access the internal representation of a Generalized model,
B, use the
This Standard Form can represent any control structure. To understand why, consider the control structure as an aggregation of fixed-coefficient elements interacting with the parametric elements:
To rewrite this in Standard Form, define
and group the tunable control elements B1, . . . , BN into the block-diagonal configuration C. P includes all the fixed components of the control architecture—actuators, sensors, and other nontunable elements—and their interconnections.