Boost gain of feedback loops at low frequency when using Control System Tuner.
Minimum Loop Gain Goal enforces a minimum loop gain in a particular frequency band. This tuning goal is useful, for example, for improving disturbance rejection at a particular location.
Minimum Loop Gain Goal imposes a minimum gain on the open-loop frequency response (L) at a specified location in your control system. You specify the minimum open-loop gain as a function of frequency (a minimum gain profile). For MIMO feedback loops, the specified gain profile is interpreted as a lower bound on the smallest singular value of L.
When you tune a control system, the minimum gain profile is converted to a minimum gain constraint on the inverse of the sensitivity function, inv(S) = (I + L).
The following figure shows a typical specified minimum gain profile (dashed line) and a resulting tuned loop gain, L (blue line). The green region represents gain profile values that are forbidden by this requirement. The figure shows that when L is much larger than 1, imposing a minimum gain on inv(S) is a good proxy for a minimum open-loop gain.
Minimum Loop Gain Goal is a constraint on the open-loop gain of the specified control loop. Thus, the loop gain is computed with the loop open at the specified location. To compute the gain with loop openings at other points in the control system, use the Compute response with the following loops open option in the Open-Loop Response Selection section of the dialog box.
Minimum Loop Gain Goal and Maximum Loop Gain Goal specify only low-gain or high-gain constraints in certain frequency bands. When you use these requirements, the software determines the best loop shape near crossover. When the loop shape near crossover is simple or well understood (such as integral action), you can use Loop Shape Goal to specify that target loop shape.
In the Tuning tab of Control System Tuner, select New Goal > Minimum gain for open-loop response to create a Minimum Gain Goal.
When tuning control systems at the command line, use
specify a minimum loop gain goal.
Use this section of the dialog box to specify the signal locations at which to compute the open-loop gain. You can also specify additional loop-opening locations for evaluating the tuning goal.
Shape open-loop response at the following locations
Select one or more signal locations in your model at which to
compute and constrain the open-loop gain. To constrain a SISO response,
select a single-valued location. For example, to constrain the open-loop
gain at a location named
'y', click Add signal
to list and select
'y'. To constrain
a MIMO response, select multiple signals or a vector-valued signal.
Compute response with the following loops open
Select one or more signal locations in your model at which to
open a feedback loop for the purpose of evaluating this tuning goal.
The tuning goal is evaluated against the open-loop configuration created
by opening feedback loops at the locations you identify. For example,
to evaluate the tuning goal with an opening at a location named
click Add signal
to list and select
To highlight any selected signal in the Simulink® model, click . To remove a signal from the input or output list, click . When you have selected multiple signals, you can reorder them using and . For more information on how to specify signal locations for a tuning goal, see Specify Goals for Interactive Tuning.
Use this section of the dialog box to specify the target minimum loop gain.
Pure integrator K/s
Check to specify a pure integrator shape for the target minimum loop gain. The software chooses the integrator constant, K, based on the values you specify for a target minimum gain and frequency. For example, to specify an integral gain profile with crossover frequency 10 rad/s, enter 1 in the Choose K to keep gain above text box. Then, enter 10 in the at the frequency text box. The software chooses the integrator constant such that the minimum loop gain is 1 at 10 rad/s.
Other gain profile
Check to specify the minimum gain profile as a function of frequency.
Enter a SISO numeric LTI model whose magnitude represents the desired
gain profile. For example, you can specify a smooth transfer function
ss model). Alternatively,
you can sketch a piecewise target loop gain using an
frd model. When you do so, the software
automatically maps the profile to a smooth transfer function that
approximates the desired minimum loop gain. For example, to specify
minimum gain of 100 (40 dB) below 0.1 rad/s, rolling off at a rate
of –20 dB/dec at higher frequencies, enter
100 10],[0 1e-1 1]).
If you are tuning in discrete time, you can specify the minimum gain profile as a discrete-time model with the same sampling time as you use for tuning. If you specify the gain profile in continuous time, the tuning software discretizes it. Specifying the profile in discrete time gives you more control over the profile near the Nyquist frequency.
Use this section of the dialog box to specify additional characteristics of the minimum loop gain goal.
Enforce goal in frequency range
Limit the enforcement of the tuning goal to a particular frequency
band. Specify the frequency band as a row vector of the form
expressed in frequency units of your model. For example, to create
a tuning goal that applies only between 1 and 100 rad/s, enter
By default, the tuning goal applies at all frequencies for continuous
time, and up to the Nyquist frequency for discrete time.
Stabilize closed loop system
By default, the tuning goal imposes a stability requirement
on the closed-loop transfer function from the specified inputs to
outputs, in addition to the gain constraint. If stability is not required
or cannot be achieved, select
No to remove
the stability requirement. For example, if the gain constraint applies
to an unstable open-loop transfer function, select
Equalize loop interactions
For multi-loop or MIMO loop gain constraints, the feedback
channels are automatically rescaled to equalize the off-diagonal (loop
interaction) terms in the open-loop transfer function. Select
disable such scaling and shape the unscaled open-loop response.
Apply goal to
Use this option when tuning multiple models at once, such as
an array of models obtained by linearizing a Simulink model at
different operating points or block-parameter values. By default,
active tuning goals are enforced for all models. To enforce a tuning
requirement for a subset of models in an array, select Only
Models. Then, enter the array indices of the models for
which the goal is enforced. For example, suppose you want to apply
the tuning goal to the second, third, and fourth models in a model
array. To restrict enforcement of the requirement, enter
the Only Models text box.
For more information about tuning for multiple models, see Robust Tuning Approaches (Robust Control Toolbox).
When you tune a control system, the software converts each tuning goal into a normalized scalar value f(x). Here, x is the vector of free (tunable) parameters in the control system. The software then adjusts the parameter values to minimize f(x) or to drive f(x) below 1 if the tuning goal is a hard constraint.
For Minimum Loop Gain Goal, f(x) is given by:
D is a diagonal scaling (for MIMO loops). S is
the sensitivity function at
Location. WS is
a frequency-weighting function derived from the minimum loop gain
profile you specify. The gain of this function roughly matches the
specified loop gain for values ranging from –20 dB to 60 dB.
For numerical reasons, the weighting function levels off outside this
range, unless the specified gain profile changes slope outside this
range. This adjustment is called regularization.
Because poles of WS close
to s = 0 or s =
lead to poor numeric conditioning for tuning, it is not recommended
to specify gain profiles with very low-frequency or very high-frequency
dynamics. For more information about regularization and its effects,
see Visualize Tuning Goals.
Although S is a closed-loop transfer function, driving f(x) < 1 is equivalent to enforcing a lower bound on the open-loop transfer function, L, in a frequency band where the gain of L is greater than 1. To see why, note that S = 1/(1 + L). For SISO loops, when |L| >> 1, |S | ≈ 1/|L|. Therefore, enforcing the open-loop minimum gain requirement, |L| > |WS|, is roughly equivalent to enforcing |WsS| < 1. For MIMO loops, similar reasoning applies, with ||S|| ≈ 1/σmin(L), where σmin is the smallest singular value.
This tuning goal imposes an implicit stability constraint on the closed-loop sensitivity function measured at the specified, evaluated with loops opened at the specified loop-opening locations. The dynamics affected by this implicit constraint are the stabilized dynamics for this tuning goal. The Minimum decay rate and Maximum natural frequency tuning options control the lower and upper bounds on these implicitly constrained dynamics. If the optimization fails to meet the default bounds, or if the default bounds conflict with other requirements, on the Tuning tab, use Tuning Options to change the defaults.