Upper Bounds on the Minimum Distance of Structured LDPC Codes

Abstract

We investigate the minimum distance of structured binary Low-Density Parity-Check (LDPC) codes whose parity-check matrices are of the form [C M] where C is circulant and of column weight 2, and M has fixed column weight r ≥ 3 and row weight at least 1. These codes are of interest because they are LDPC codes which come with a natural linear-time encoding algorithm. We show that the minimum distance of these codes is in O(nr-2r-1 + ε), where n is the code length and ε > 0 is arbitrarily small. This improves the previously known upper bound in O(nr-1r) on the minimum distance of such codes.