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arxiv: 2001.04800 · v2 · pith:S2QKBHDGnew · submitted 2020-01-14 · 💻 cs.IT · cs.CR· math.IT

Low-Rank Parity-Check Codes over the Ring of Integers Modulo a Prime Power

classification 💻 cs.IT cs.CRmath.IT
keywords codesfiniteringsapplicationsboundlow-ranklrpcparity-check
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We define and analyze low-rank parity-check (LRPC) codes over extension rings of the finite chain ring $\mathbb{Z}_{p^r}$, where $p$ is a prime and $r$ is a positive integer. LRPC codes have originally been proposed by Gaborit et al.(2013) over finite fields for cryptographic applications. The adaption to finite rings is inspired by a recent paper by Kamche et al. (2019), which constructed Gabidulin codes over finite principle ideal rings with applications to space-time codes and network coding. We give a decoding algorithm based on simple linear-algebraic operations. Further, we derive an upper bound on the failure probability of the decoder. The upper bound is valid for errors whose rank is equal to the free rank.

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