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Moderate-density parity-check codes from projective bundles

Bariffi, Jessica; Mattheus, Sam; Neri, Alessandro; Rosenthal, Joachim (2022). Moderate-density parity-check codes from projective bundles. Designs, Codes and Cryptography, 90(12):2943-2966.

Abstract

New constructions for moderate-density parity-check (MDPC) codes using finite geometry are proposed. We design a parity-check matrix for the main family of binary codes as the concatenation of two matrices: the incidence matrix between points and lines of the Desarguesian projective plane and the incidence matrix between points and ovals of a projective bundle. A projective bundle is a special collection of ovals which pairwise meet in a unique point. We determine the minimum distance and the dimension of these codes, and we show that they have a natural quasi-cyclic structure. We consider alternative constructions based on an incidence matrix of a Desarguesian projective plane and compare their error-correction performance with regards to a modification of Gallager’s bit-flipping decoding algorithm. In this setting, our codes have the best possible error-correction performance after one round of bit-flipping decoding given the parameters of the code’s parity-check matrix.

Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:07 Faculty of Science > Institute of Mathematics
Dewey Decimal Classification:510 Mathematics
Scopus Subject Areas:Physical Sciences > Theoretical Computer Science
Physical Sciences > Computer Science Applications
Physical Sciences > Discrete Mathematics and Combinatorics
Physical Sciences > Applied Mathematics
Uncontrolled Keywords:Applied Mathematics, Computer Science Applications ; MDPC codes · Projective bundle · Projective plane · Bit-flipping decoding algorithm
Language:English
Date:1 December 2022
Deposited On:04 Aug 2022 16:11
Last Modified:28 Aug 2024 01:35
Publisher:Springer
ISSN:0925-1022
Additional Information:Mathematics Subject Classification 11T71 · 51E05
OA Status:Hybrid
Publisher DOI:https://doi.org/10.1007/s10623-022-01054-y
Project Information:
  • Funder: SNSF
  • Grant ID: P2ZHP2_187711
  • Project Title: Algebraic Methods for Rank-Metric Codes in Post-Quantum Cryptography and Communications
  • Funder: SNSF
  • Grant ID: 200021_188430
  • Project Title: New Constructions of Convolutional Codes
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  • Language: English
  • Licence: Creative Commons: Attribution 4.0 International (CC BY 4.0)

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