Design inverse sinc filter
Filtering / Filter Designs
dspfdesign
This block brings the filter design capabilities of the
function
to the Simulink^{®} environment.filterBuilder
See Inverse Sinc Filter Design — Main Pane for more information about the parameters of this block. The Data Types and Code Generation panes are not available for blocks in the DSP System Toolbox™ Filter Designs library.
This button opens the Filter Visualization Tool (fvtool
) from the Signal
Processing Toolbox™ product.
You can use the tool to display:
Magnitude response, phase response, and group delay in the frequency domain.
Impulse response and step response in the time domain.
Polezero information.
The tool also helps you evaluate filter performance by providing information about filter order, stability, and phase linearity. For more information on FVTool, see the Signal Processing Toolbox documentation.
In this group, you specify your filter format, such as the impulse response and the filter order.
Select either Minimum
(the default)
or Specify
from the dropdown list. Selecting Specify
enables
the Order option (see the following sections)
so you can enter the filter order.
Select Lowpass
or Highpass
to
design an inverse sinc lowpass or highpass filter.
Select Singlerate
, Decimator
, Interpolator
,
or Samplerate converter
. Your choice determines
the type of filter as well as the design methods and structures that
are available to implement your filter. By default, the block specifies
a singlerate filter.
Selecting Decimator
or Interpolator
activates
the Decimation Factor or the Interpolation
Factor options respectively.
Selecting Samplerate converter
activates
both factors.
Enter the filter order. This option is enabled only if you set
the Order mode to Specify
.
Enter the decimation factor. This option is enabled only if
the Filter type is set to Decimator
or Samplerate
converter
. The default value is 2.
Enter the interpolation factor. This option is enabled only
if the Filter type is set to Interpolator
or Samplerate
converter
. The default value is 2.
The parameters in this group allow you to specify your filter response curve.
Regions between specification values such as Passband frequency and Stopband frequency represent transition regions where the filter response is not constrained.
When Order mode is Specify
,
select the filter features that the block uses to define the frequency
response characteristics. The list contains the following options,
when available for the filter specifications.
Passband and stopband frequencies
— Define the filter by specifying
the frequencies for the edges for the stop and
passbands.
Passband frequency
— For IIR filters, define the filter by
specifying frequencies for the edges of the passband.
Stopband frequency
— For IIR filters, define the filter by
specifying frequencies for the edges of the
stopbands.
Cutoff (6dB) frequency
— For FIR filters, define the filter response
by specifying the locations of the 6 dB point. The 6 dB
point is the frequency for the point six decibels below the
passband value.
Use this parameter to specify whether your frequency settings are normalized or in absolute
frequency. Select Normalized (0 to 1)
to
enter frequencies in normalized form. This behavior is the default. To
enter frequencies in absolute values, select one of the frequency units
from the dropdown list—Hz
,
kHz
, MHz
, or
GHz
. Selecting one of the unit options
enables the Input sample rate parameter.
Fs, specified in the units you selected for Frequency units, defines the sampling frequency at the filter input. When you provide an input sampling frequency, all frequencies in the specifications are in the selected units as well. This parameter is available when you select one of the frequency options from the Frequency units list.
Enter the frequency at the end of the passband. Specify the value in either normalized frequency units or the absolute units you select in Frequency units.
Enter the frequency at the start of the stopband. Specify the value in either normalized frequency units or the absolute units you select in Frequency units.
When Frequency constraints is Cutoff (6dB)
frequency
, specify the frequency of the 6 dB point.
Specify the value in either normalized frequency units or the absolute
units you select Frequency units.
Parameters in this group specify the filter response in the passbands and stopbands.
Specify the units for any parameter you provide in magnitude specifications. From the dropdown list, select one of the following options:
Linear
— Specify
the magnitude in linear units.
dB
— Specify the
magnitude in decibels (default)
Squared
— Specify
the magnitude in squared units.
Enter the filter ripple allowed in the passband in the units you choose for Magnitude units, either linear or decibels.
Enter the filter attenuation in the stopband in the units you choose for Magnitude units, either linear or decibels.
The parameters in this group allow you to specify the design method and structure of your filter.
Lists the design methods available for the frequency and magnitude
specifications you entered. When you change the specifications for
a filter, such as changing the impulse response, the methods available
to design filters changes as well. The default FIR method is Equiripple
.
The options for each design are specific for each design method. This section does not present all of the available options for all designs and design methods. There are many more that you encounter as you select different design methods and filter specifications. The following options represent some of the most common ones available.
Density factor controls the density of the frequency grid over which the design method optimization evaluates your filter response function. The number of equally spaced points in the grid is the value you enter for Density factor times (filter order + 1).
Increasing the value creates a filter that more closely approximates an ideal equiripple filter but increases the time required to design the filter. The default value of 20 represents a reasonable trade between the accurate approximation to the ideal filter and the time to design the filter.
Specify the phase constraint of the filter as Linear
, Maximum
,
or Minimum
.
When you select this parameter, the design method determines
and design the minimum order filter to meet your specifications. Some
filters do not provide this parameter. Select Any
, Even
,
or Odd
from the dropdown list to direct
the design to be any minimum order, or minimum even order, or minimum
odd order.
Stopband shape lets you specify how the stopband changes with increasing frequency. Choose one of the following options;
Flat
— Specifies
that the stopband is flat. The attenuation does not change as the
frequency increases.
Linear
— Specifies
that the stopband attenuation changes linearly as the frequency increases.
Change the slope of the stopband by setting Stopband decay.
1/f
— Specifies
that the stopband attenuation changes exponentially as the frequency
increases, where f
is the frequency. Set the power
(exponent) for the decay in Stopband decay.
When you set Stopband shape, Stopband decay specifies the amount of decay applied to the stopband. the following conditions apply to Stopband decay based on the value of Stopband Shape:
When you set Stopband shape to Flat
, Stopband
decay has no affect on the stopband.
When you set Stopband shape to Linear
,
enter the slope of the stopband in units of dB/rad/s. The block applies
that slope to the stopband.
When you set Stopband shape to 1/f
,
enter a value for the exponent n in the relation
(1/f)^{n} to define the stopband decay. The
block applies the (1/f)^{n} relation to the
stopband to result in an exponentially decreasing stopband attenuation.
A frequency dilation factor. The Sinc frequency factor, C , parameterizes the passband magnitude response for a lowpass design through H(ω) = sinc(Cω)^(P) and through H(ω) = sinc(C(1ω))^(P) for a highpass design.
Negative power of passband magnitude response. The Sinc power, P, parameterizes the passband magnitude response for a lowpass design through H(ω) = sinc(Cω)^(P) and through H(ω) = sinc(C(1ω))^(P) for a highpass design.
For the filter specifications and design method you select, this parameter lists the filter structures available to implement your filter. By default, FIR filters use directform structure, and IIR filters use directform II filters with SOS.
Select this check box to implement the filter as a subsystem of basic Simulink blocks. Clear the check box to implement the filter as a highlevel subsystem. By default, this check box is cleared.
The highlevel implementation provides better compatibility across various filter structures, especially filters that would contain algebraic loops when constructed using basic elements. On the other hand, using basic elements enables the following optimization parameters:
Optimize for zero gains — Terminate chains that contain Gain blocks with a gain of zero.
Optimize for unit gains — Remove Gain blocks that scale by a factor of one.
Optimize for delay chains — Substitute delay chains made up of n unit delays with a single delay by n.
Optimize for negative gains — Use subtraction in Sum blocks instead of negative gains in Gain blocks.
Specify how the block should process the input. The available options may vary depending on he settings of the Filter Structure and Use basic elements for filter customization parameters. You can set this parameter to one of the following options:
Columns as channels (frame based)
—
When you select this option, the block treats each column of the input
as a separate channel.
Elements as channels (sample based)
—
When you select this option, the block treats each element of the
input as a separate channel.
When the Filter type parameter specifies a multirate filter, select the rate processing rule for the block from following options:
Enforce singlerate processing
—
When you select this option, the block maintains the sample rate of
the input.
Allow multirate processing
—
When you select this option, the block adjusts the rate at the output
to accommodate an increased or reduced number of samples. To select
this option, you must set the Input processing parameter
to Elements as channels (sample based)
.
Select this check box to enable the specification of coefficients using MATLAB^{®} variables. The available coefficient names differ depending on the filter structure. Using symbolic names allows tuning of filter coefficients in generated code. By default, this check box is cleared.
Port  Supported Data Types 

Input 

Output 
