Fixed-point CIC decimator
hm = mfilt.cicdecim(r,m,n,iwl,owl,wlps)
All of the input arguments are optional. To enter any optional value, you must include all optional values to the left of your desired value.
When you omit one or more input options, the omitted option applies the default values shown in the table below.
The following table describes the input arguments for creating hm.
Decimation factor applied to the input signal. Sharpens the response curve to let you change the shape of the response. r must be an integer value greater than or equal to 1. The default value is 2.
Differential delay. Changes the shape, number, and location of nulls in the filter response. Increasing m increases the sharpness of the nulls and the response between nulls. In practice, differential delay values of 1 or 2 are the most common. m must be an integer value greater than or equal to 1. The default value is 1.
Number of sections. Deepens the nulls in the response curve. Note that this is the number of either comb or integrator sections, not the total section count. 2 is the default value.
Word length of the input signal. Use any integer number of bits. The default value is 16 bits.
Word length of the output signal. It can be any positive integer number of bits. By default, owl is 16 bits.
Defines the number of bits per word in each filter section while accumulating the data in the integrator sections or while subtracting the data during the comb sections (using 'wrap' arithmetic). Enter wlps as a scalar or vector of length 2*n, where n is the number of sections. When wlps is a scalar, the scalar value is applied to each filter section. The default is 16 for each section in the decimator.
When you elect to specify wlps as an input argument, the FilterInternals property automatically switches from the default value of 'FullPrecision' to 'SpecifyWordLengths'.
CIC decimators have the following constraint — the word lengths of the filter section must be monotonically decreasing. The word length of each filter section must be the same size as, or smaller than, the word length of the previous filter section.
The formula for Bmax, the most significant bit at the filter output, is given in the Hogenauer paper in the References below.
where Bin is the number of bits of the input.
The cast operations shown in the diagram in Algorithms perform the changes between the word lengths of each section. When you specify word lengths that do not follow the constraints above, the constructor returns an error.
When you specify the word lengths correctly, the most significant bit Bmax stays the same throughout the filter, while the word length of each section either decreases or stays the same. This can cause the fraction length to change throughout the filter as least significant bits are truncated to decrease the word length, as shown in Algorithms.
Objects have properties that control the way the object behaves. This table lists all the properties for the filter, with a description of each.
Reports the kind of arithmetic the filter uses. CIC decimators are always fixed-point filters.
Any positive integer
Amount to reduce the input sampling rate.
Any positive integer
Sets the differential delay for the filter. Usually a value of one or two is appropriate.
mfilt structure string
Reports the type of filter object. You cannot set this property — it is always read only and results from your choice of mfilt objects.
FullPrecision, MinWordLengths, SpecifyPrecision, SpecifyWordLengths
Set the usage mode for the filter. Refer to Usage Modes below for details.
Any positive integer
The number of bits applied to the fraction length to interpret the input data to the filter.
Integers in the range
Contains a value derived from the number of input samples and the decimation factor — InputOffset = mod(length(nx),m) where nx is the number of input samples that have been processed so far and m is the decimation factor.
The InputOffset property applies only when you set the PersistentMemory property to true. See InputOffset for more information.
Any positive integer
The number of bits applied to the word length to interpret the input data to the filter.
Any positive integer
Number of sections used in the decimator. Generally called n. Reflects either the number of decimator or comb sections, not the total number of sections in the filter.
Any positive integer
The number of bits applied to the fraction length to interpret the output data from the filter. Read-only.
Any positive integer
The number of bits applied to the word length to interpret the output data from the filter.
false or true
Determines whether the filter states get restored to their starting values for each filtering operation. The starting values are the values in place when you create the filter if you have not changed the filter since you constructed it. PersistentMemory returns to zero any state that the filter changes during processing. States that the filter does not change are not affected. When PersistentMemory is false, you cannot access the filter states. Setting PersistentMemory to true reveals the States property so you can modify the filter states.
Any integer or a vector of length 2*n.
Defines the bits per section used while accumulating the data in the integrator sections or while subtracting the data during the comb sections (using 'wrap' arithmetic). Enter SectionWordLengths as a scalar or vector of length 2*n, where n is the number of sections. When SectionWordLengths is a scalar, the scalar value is applied to each filter section. When SectionWordLengths is a vector of values, the values apply to the sections in order. The default is 16 for each section in the decimator. Available when FilterInternals is 'SpecifyWordLengths'.
m+1-by-n matrix of zeros, after you call function int.
Stored conditions for the filter, including values for the integrator and comb sections before and after filtering. m is the differential delay of the comb section and n is the number of sections in the filter. The integrator states are stored in the first matrix row. States for the comb section fill the remaining rows in the matrix. Available for modification when PersistentMemory is true. Refer to the filtstates object in Signal Processing Toolbox™ documentation for more general information about the filtstates object.
There are four modes of usage for this which are set using the FilterInternals property
FullPrecision — All word and fraction lengths set to Bmax + 1, called Baccum by Fred Harris in . Full Precision is the default setting.
MinWordLengths — Automatically set the sections for minimum word lengths.
SpecifyWordLengths — Specify the word lengths for each section.
SpecifyPrecision — Specify precision by providing values for the word and fraction lengths for each section.
In full precision mode, the word lengths of all sections and the output are set to Baccum as defined by
where Nsecs is the number of filter sections.
Section fraction lengths and the fraction length of the output are set to the input fraction length.
Here is the display for this mode:
FilterStructure: 'Cascaded Integrator-Comb Decimator' Arithmetic: 'fixed' DifferentialDelay: 1 NumberOfSections: 2 DecimationFactor: 4 PersistentMemory: false InputWordLength: 16 InputFracLength: 15 FilterInternals: 'FullPrecision'
In minimum word length mode, you control the output word length explicitly. When the output word length is less than Baccum, roundoff noise is introduced at the output of the filter. Hogenauer's bit pruning theory (refer to ) states that one valid design criterion is to make the word lengths of the different sections of the filter smaller than Baccum as well, so that the roundoff noise introduced by all sections does not exceed the roundoff noise introduced at the output.
In this mode, the design calculates the word lengths of each section to meet the Hogenauer criterion. The algorithm subtracts the number of bits computed using eq. 21 in Hogenauer's paper from Baccum to determine the word length each section.
To compute the fraction lengths of the different sections, the algorithm notes that the bits thrown out for this word length criterion are least significant bits (LSB), therefore each bit thrown out at a particular section decrements the fraction length of that section by one bit compared to the input fraction length. Setting the output wordlength for the filter automatically sets the output fraction length as well.
Here is the display for this mode:
FilterStructure: 'Cascaded Integrator-Comb Decimator' Arithmetic: 'fixed' DifferentialDelay: 1 NumberOfSections: 2 DecimationFactor: 4 PersistentMemory: false InputWordLength: 16 InputFracLength: 15 FilterInternals: 'MinWordLengths' OutputWordLength: 16
Specify word lengths
In this mode, the design algorithm discards the LSBs, adjusting the fraction length so that unrecoverable overflow does not occur, always producing a reasonable output.
You can specify the word lengths for all sections and the output, but you cannot control the fraction lengths for those quantities.
To specify the word lengths, you enter a vector of length 2*(NumberOfSections), where each vector element represents the word length for a section. If you specify a scalar, such as Baccum, the full-precision output word length, the algorithm expands that scalar to a vector of the appropriate size, applying the scalar value to each section.
The CIC design does not check that the specified word lengths are monotonically decreasing. There are some cases where the word lengths are not necessarily monotonically decreasing, for example
hcic=mfilt.cicdecim; hcic.FilterInternals='minwordlengths'; hcic.Outputwordlength=14;
which are valid CIC filters but the word lengths do not decrease monotonically across the sections.
Here is the display for the SpecifyWordLengths mode.
FilterStructure: 'Cascaded Integrator-Comb Decimator' Arithmetic: 'fixed' DifferentialDelay: 1 NumberOfSections: 2 DecimationFactor: 4 PersistentMemory: false InputWordLength: 16 InputFracLength: 15 FilterInternals: 'SpecifyWordLengths' SectionWordLengths: [19 18 18 17] OutputWordLength: 16
In this mode, you have full control over the word length and fraction lengths of all sections and the filter output.
When you elect the SpecifyPrecision mode, you must enter a vector of length 2*(NumberOfSections) with elements that represent the word length for each section. When you enter a scalar such as Baccum, mfilt.cicdecim expands that scalar to a vector of the appropriate size and applies the scalar value to each section and the output. The design does not check that this vector is monotonically decreasing.
Also, you must enter a vector of length 2*(NumberOfSections) with elements that represent the fraction length for each section as well. When you enter a scalar such as Baccum, mfilt.cicdecim applies scalar expansion as done for the word lengths.
Here is the SpecifyPrecision display.
FilterStructure: 'Cascaded Integrator-Comb Decimator' Arithmetic: 'fixed' DifferentialDelay: 1 NumberOfSections: 2 DecimationFactor: 4 PersistentMemory: false InputWordLength: 16 InputFracLength: 15 FilterInternals: 'SpecifyPrecision' SectionWordLengths: [19 18 18 17] SectionFracLengths: [14 13 13 12] OutputWordLength: 16 OutputFracLength: 11
In the states property you find the states for both the integrator and comb portions of the filter. states is a matrix of dimensions m + 1-by-n, with the states apportioned as follows:
States for the integrator portion of the filter are stored in the first row of the state matrix.
States for the comb portion fill the remaining rows in the state matrix..
To review the states of a CIC filter, use int to assign the states to a variable in MATLAB. As an example, here are the states for a CIC decimator hm before and after filtering a data set.
x = fi(ones(1,10),true,16,0); % Fixed-point input data. hm = mfilt.cicdecim(2,1,2,16,16,16); sts=int(hm.states) set(hm,'InputFracLength',0); % Integer input specified. y=filter(hm,x); sts=int(hm.states)
STS is an integer matrix that int returns from the contents of the filtstates.cic object in hm.
When you design your CIC decimation filter, remember the following general points:
The filter output spectrum has nulls at ω = k * 2π/rm radians, k = 1,2,3....
Aliasing and imaging occur in the vicinity of the nulls.
n, the number of sections in the filter, determines the passband attenuation. Increasing n improves the filter ability to reject aliasing and imaging, but it also increases the droop (or rolloff) in the filter passband. Using an appropriate FIR filter in series after the CIC decimation filter can help you compensate for the induced droop.
The DC gain for the filter is a function of the decimation factor. Raising the decimation factor increases the DC gain.
This example applies a decimation factor r equal to 8 to a 160-point impulse signal. The signal output from the filter has 160/r, or 20, points or samples. Choosing 10 bits for the word length represents a fairly common setting for analog to digital converters. The plot shown after the code presents the stem plot of the decimated signal, with 20 samples remaining after decimation:
m = 2; % Differential delays in the filter. n = 4; % Filter sections r = 8; % Decimation factor x = int16(zeros(160,1)); x(1) = 1; % Create a 160-point % impulse signal. hm = mfilt.cicdecim(r,m,n); % Expects 16-bit input % by default. y = filter(hm,x); stem(double(y)); % Plot output as a stem plot. xlabel('Samples'); ylabel('Amplitude'); title('Decimated Signal');
The next example demonstrates one way to compute the filter frequency response, using a 4-section decimation filter with the decimation factor set to 7:
hm = mfilt.cicdecim(7,1,4); fvtool(hm)
FVTool provides ways for you to change the title and x labels to match the figure shown. Here's the frequency response plot for the filter. For details about the transfer function used to produce the frequency response, refer to  in the References section.
This final example demonstrates the decimator for converting from 44.1 kHz audio to 22.05 kHz — decimation by two. To overlay the before and after signals, scale the output and plot the signals on a stem plot.
r = 2; % Decimation factor. hm = mfilt.cicdecim(r); % Use default NumberOfSections & % DifferentialDelay property values. fs = 44.1e3; % Original sampling frequency: 44.1kHz. n = 0:10239; % 10240 samples, 0.232 second long signal. x = sin(2*pi*1e3/fs*n);% Original signal, sinusoid at 1kHz. y_fi = filter(hm,x); % 5120 samples, still 0.232 seconds. % Scale the output to overlay the stem plots. x = double(x); y = double(y_fi); y = y/max(abs(y)); stem(n(1:44)/fs,x(2:45)); hold on; % Plot original signal % sampled at 44.1kHz. stem(n(1:22)/(fs/r),y(3:24),'r','filled'); % Plot decimated % signal (22.05kHz) % in red. xlabel('Time (seconds)');ylabel('Signal Value');
To show how the CIC decimation filter is constructed, the following figure presents a block diagram of the filter structure for a two-section CIC decimation filter (n = 2). fs is the high sampling rate, the input to the decimation process.
For details about the bits that are removed in the Comb section, refer to  in References.
mfilt.cicdecim calculates the fraction length at each section of the decimator to avoid overflows at the output of the filter.
 Hogenauer, E. B., "An Economical Class of Digital Filters for Decimation and Interpolation," IEEE® Transactions on Acoustics, Speech, and Signal Processing, ASSP-29(2): pp. 155-162, 1981
 Meyer-Baese, Uwe, "Hogenauer CIC Filters," in Digital Signal Processing with Field Programmable Gate Arrays, Springer, 2001, pp. 155-172
 Harris, Fredric J, Multirate Signal Processing for Communication Systems, Prentice-Hall PTR, 2004 , pp. 343