Skip to content

kshabunov/ecclab

Repository files navigation

ECCLab

This is a new repo for the set of source files that I have been developing and used for error correcting code research with Dr. Ilya Dumer since 1998. The main area of the research addressed efficient recursive decoding for Reed-Muller (RM) codes and their subcodes with frozen bits. Originally, these were research programs for private use. Lately, we decided to revamp them, mostly for a better readability, and make them available as an open source project.

These programs can be used to run simulations of RM codes and their subcodes, Polar codes and CA-Polar codes on the binary symmetric channels and AWGN channels. The programs can also be used for reference and developments. This is a set of tools for research work in progress, no formal releases are planned so far.

Build

The simulation programs are written in C.

To build from command line with CMakeproceed as follows starting from the project root directory:

mkdir build
cd build
cmake -DCMAKE_BUILD_TYPE=Release ..
cmake --build . --target install --config Release

This will build the executables and copy them to the work subdirectory.

To build from command line with make run it in the project root directory. It will build executables to the work subdirectory. The provided makefile uses gcc, but it can be replaced with any other C compiler.

Running

Typical usage

The simulation programs are run from the command line:

executable simulation_parameters_file [options]

Common options are:

  • -nr - don't randomize the pseudorandom number generator (useful for debugging).
  • -si - set saving interval in seconds.
  • -ri - set return (status update) interval in seconds.

Simulation parameters file format

These are plain text with the following structure:

  • Empty lines are skipped.
  • Lines starting with # are considered to be comments and ignored.
  • Each parameter is a key/value pair separated by one or more spaces.
  • Parameter may have a group value surrounded by curly brackets ({}).
  • Any parameter with unknown key is ignored.

Parameter files may include other parameter files using include some.file directive. The include path is considered to be relative to the current directory.

For example:

% Include file:
include another.file

% Single value parameter:
param value

% Single boolean value parameter (can be "on" or "off):
boolean_param on

% Group value parameter. Items may have several tokens separated by spaces:
group_param {
  item1
  item2
}

Common simulation parameters

  • res_file filename - file for saving simulation results. String. Required.
  • SNR_val_trn {...} - Eb/No SNR values with required number of trials. Group value, each item contains an SNR value and the number of trials that should be simulated for this value (see an example below). Either this or EbNo_values is required.
  • EbNo_values {...} - Eb/No SNR values to simulate at. Group value, each item contains single SNR value. Either this or SNR_val_trn is required.
  • min_trials_per_snr - minimum number of trials that should be simulated for each SNR value. Default is 1.
  • min_errors_per_snr - minimum number of errors per block that should be observed for each SNR value. Default is 1.
  • random_codeword on|off - Use random information sequence for every simulation trial or not. Boolean. Off by default.
  • ml_lb on|off - Estimate ML lower bound or not. Boolean. Off by default.

Typical use case is to set EbNo_values together with min_trials_per_snr and min_errors_per_snr:

res_file result.spf
EbNo_values { -0.5 -0.25 0 0.25 0.5 0.75 1 1.25 1.5 1.75 2 }
min_trials_per_snr 20000
min_errors_per_snr 100
random_codeword on
ml_lb off

Another option is to set the number of trials for each SNR value with SNR_val_trn:

res_file result.spf
SNR_val_trn {
   1      20000
   1.25   50000
   1.5    100000
}
random_codeword on
ml_lb off

More examples may be found in the ./work subdirectory.

dtrm0_bg

Simulate recursive decoding for RM codes, AWGN channel. RM code is recursively decomposed down to (0, m) and (m, m) nodes.

Specific simulation parameters:

  • RM_m m - RM m parameter. Integer, positive, non-zero. Required.
  • RM_r r - RM r parameter. Integer, positive, non-zero. Required.

dtrm1_bg

Simulate recursive decoding for RM codes, AWGN channel. RM code is recursively decomposed down to (1, m) and (m, m) nodes. First order nodes are decoded with a fast ML decoder.

Specific simulation parameters:

  • RM_m m - RM m parameter. Integer, positive, non-zero. Required.
  • RM_r r - RM r parameter. Integer, positive, non-zero. Required.

dtrm_glp_bg

Simulate recursive list decoding for RM codes and their subcodes (SubRM), AWGN channel. This algorithm was applied later to Polar codes with much success and now is known as Successive Cancellation List (SCL) decoding. For pure RM codes, we may also use up to m! permutations.

Specific simulation parameters:

  • RM_m m - RM m parameter. Integer, positive, non-zero. Required.
  • RM_r r - RM r parameter. Integer, positive, non-zero. Required.
  • border_node_mask mask_str - mask marking border nodes that should be set as zeroes thus specifying the RM subcode (see explanation below). Binary string. Required.
  • border_node_lsize L - list size. Integer, positive, non-zero. Required.
  • permutations {...} - permutations set. Group value, each line defines one permutation (see example below). No additional permutations, except (0 1 2 ...), are used by default.

border_node_mask mask_str is a binary string with each bit symbol corresponding to a single (0, m) or (m, m) node on the border of the RM code decomposition triangle. The order of the bits is the order by which the recursive decoder visits these nodes. If the bit is set as 0 the corresponding node is excluded. For example, here is the mask for RM(2, 4) with the first border node (which is the leftmost (0, 2)) eliminated:

border_node_mask 011111

This results in a subcode of RM(2, 4) with k = 10.

permutations is a group parameter. Each line consists of m integers from 0 to m - 1 separated by spaces. They specify a permutation of the m variables (relative to the original order "0 1 ... m - 1") used in the boolean polynomials that define the code. Each permutation of these variables corresponds to certain permutations of codeword and information symbols. Further explanations you can find in, for example, chapter 13.9 of the classical MacWilliams and Sloane book.

The program works with any permutation set. We got good results for m = 7–10 with the set of mCr permutations that put any r variables out of m to the last r positions. For example, here are all 6 possible permutations that put any 2 out of 4 variables to the last 2 positions for RM(2, 4):

permutations {
  2 3 0 1
  1 3 0 2
  1 2 0 3
  0 3 1 2
  0 2 1 3
  0 1 2 3
}

ca_polar_scl_bg

Simulate Successive Cancellation List (SCL) decoding for pure Polar and CRC-aided (CA) Polar codes, AWGN channel. This is dtrm_glp codec tailored for Polar codes. The difference is that we start only from (m, m) nodes and decompose everything down to (0, 0) nodes. When no CRC is given, the decoder outputs the remaining candidate with the best metric as dtrm_glp would do. When CRC is set, the decoder function picks the best candidate with the correct CRC and returns RC_OK. If there is no candidate with correct CRC in the list, the decoder function returns RC_DEC_ERASURE and the candidate with the best metric.

Specific simulation parameters:

  • c_m m - Polar m parameter. Integer, positive, non-zero. Required.
  • info_bits_mask mask_str - binary mask marking frozen information bits in the same way as border_node_mask marks zeroed border nodes for dtrm_glp. Binary string. Required.
  • ca_polar_crc poly_str - coefficients of the CRC polynomial starting from higher powers, no leading 1. Binary string. No CRC is used by default.
  • list_size L - list size. Integer, positive, non-zero. Required.

Implementation details

Internal reliability representation formats

While doing the research we tried several internal representation formats for symbol reliability values. In order to be able to switch between different representations a system of macros was developed.

The related source code is located in the formats subdirectory. There is the top level include file formats.h and a number of format_*.h sub-include files specific for each representation.

Octave / Matlab

Though I tried to keep the code portable between Octave/Matlab, I used it only in Octave, so no guarantee it will run in Matlab.

loadsrf

This is a MEX function that loads the data from a simulation results file to an Octave scalar structure variable with the following fields:

  • n - codeword length.
  • k - information block length.
  • EbNo - Eb/No SNR values array.
  • BER - bit error rate values array.
  • WER - word error rate values array.
  • ERR - erasure rate values array.
  • MLER - ML lower bound values array. It will contain zeroes for SNR points where the bound was not calculated.

All array fields have the same length. Error rate values correspond to Eb/No values with the same array index. Thus, you should be able to plot the data as follows:

data = loadsrf('path/to/file.srf');
semilogy(data.EbNo, data.WER, data.EbNo, data.MLER);

It can be compiled by running the following command in Octave/Matlab from the Octave subdirectory:

mex ./loadsrf.c ./ui_octave_txt.c ../common/spf_par.c

References

  • E. Arikan, “Channel Polarization: A Method for Constructing Capacity-Achieving Codes for Symmetric Binary-Input Memoryless Channels,” IEEE Transactions on Information Theory, vol. 55, no. 7, July 2009. IEEE Xplore
  • I. Dumer, K. Shabunov, "Soft-decision decoding of Reed-Muller codes: Recursive lists", IEEE Transactions On Information Theory, vol. 52, no. 3, March 2006. IEEE Xplore, arXiv
  • I. Dumer, K. Shabunov, "Recursive and permutation decoding for Reed-Muller codes", Proc. 2002 IEEE Int. Symp. Inform. Theory, pp. 146, 2002. IEEE Xplore
  • I. Dumer, K. Shabunov, "Near-optimum decoding for subcodes of Reed-Muller codes", 2001 IEEE Intern. Symp. Info. Theory, pp. 329, June 24–29, 2001. IEEE Xplore
  • I. Dumer, K. Shabunov, "Recursive decoding of Reed-Muller codes", Proc. 2000 IEEE Int. Symp. Inform. Theory, pp. 63, 2000. IEEE Xplore
  • F.J. MacWilliams and N.J.A. Sloane, "The Theory of Error-Correcting Codes", Elsevier Science. Amazon
  • I. Tal and A. Vardy, "List Decoding of Polar Codes", IEEE Transactions on Information Theory, vol. 61, no. 5, May 2015. IEEE Xplore

Releases

No releases published

Packages

No packages published

Languages