On the lifting degree of girth-8 QC-LDPC codes

Abstract

The lifting degree and the deterministic construction of quasi-cyclic low-density parity-check (QC-LDPC) codes have been extensively studied, with many construction methods in the literature, including those based on finite geometry, array-based codes, computer search, and combinatorial techniques. In this paper, we focus on the lifting degree p required for achieving a girth of 8 in (3,L) fully connected QC-LDPC codes, and we propose an improvement over the classical lower bound p≥ 2L-1, enhancing it to p≥ 5L2-11L+132+12. Moreover, we demonstrate that for girth-8 QC-LDPC codes containing an arithmetic row in the exponent matrix, a necessary condition for achieving a girth of 8 is p≥ 12L2+12L. Additionally, we present a corresponding deterministic construction of (3,L) QC-LDPC codes with girth 8 for any p≥ 12L2+12L+ L-12, which approaches the lower bound of 12L2+12L. Under the same conditions, this construction achieves a smaller lifting degree compared to prior methods. To the best of our knowledge, the proposed order of lifting degree matches the smallest known, on the order of 12L2+O (L).

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