Rank-Metric Codes Over Finite Principal Ideal Rings and Applications

Abstract: Several problems in algebraic geometry and coding theory over finite rings are modeled by systems of algebraic equations. Among these problems, we have the rank decoding problem, which is used in the construction of public-key cryptography. In 2004, Nechaev and Mikhailov proposed two methods for solving systems of polynomial equations over finite chain rings. These methods used solutions over the residual field to construct all solutions step by step. However, for some types of algebraic equations, one simply … Show more

“…The simplified bound (14) in Theorem 5 coincides up to a constant with the bound by Gaborit et at. [10] in the case of a finite field (Galois ring with r = 1).…”

“…Network coding over certain finite rings was intensively studied in [ 7 , 11 ], motivated by works on nested-lattice-based network coding [ 8 , 18 , 26 , 28 ] which show that network coding over finite rings may result in more efficient physical-layer network coding schemes. Kamche et al [ 14 ] showed how lifted rank-metric codes over finite rings can be used for error correction in network coding. The result uses a similar approach as [ 23 ] to transformation the channel output into a rank-metric error-erasure decoding problem.…”

“…It was first shown in [ 15 ] how to construct space-time codes with optimal rate-diversity tradeoff via a rank-preserving mapping from rank-metric codes over Galois rings. This result was generalized to arbitrary finite principal ideal rings in [ 14 ]. The use of finite rings instead of finite fields has advantages since the rank-preserving mapping can be chosen more flexibly.…”

“…Kamche et al also defined and extensively studied Gabidulin codes over finite principal ideal rings. In particular, they proposed a Welch–Berlekamp-like decoder for Gabidulin codes and a Gröbner-basis-based decoder for interleaved Gabidulin codes [ 14 ].…”

“…For errors, the success probability is already and for , it is . A Gabidulin code as in [ 14 ], over the same ring and the same parameters, can correct any error of rank up to 30 (i.e., the same maximal radius). However, the currently fastest decoder for Gabidulin codes over rings [ 14 ] has a larger complexity than the LRPC decoder in Sect.…”

Low-rank parity-check codes over Galois rings

“…The simplified bound (14) in Theorem 5 coincides up to a constant with the bound by Gaborit et at. [10] in the case of a finite field (Galois ring with r = 1).…”

“…Network coding over certain finite rings was intensively studied in [ 7 , 11 ], motivated by works on nested-lattice-based network coding [ 8 , 18 , 26 , 28 ] which show that network coding over finite rings may result in more efficient physical-layer network coding schemes. Kamche et al [ 14 ] showed how lifted rank-metric codes over finite rings can be used for error correction in network coding. The result uses a similar approach as [ 23 ] to transformation the channel output into a rank-metric error-erasure decoding problem.…”

“…It was first shown in [ 15 ] how to construct space-time codes with optimal rate-diversity tradeoff via a rank-preserving mapping from rank-metric codes over Galois rings. This result was generalized to arbitrary finite principal ideal rings in [ 14 ]. The use of finite rings instead of finite fields has advantages since the rank-preserving mapping can be chosen more flexibly.…”

“…Kamche et al also defined and extensively studied Gabidulin codes over finite principal ideal rings. In particular, they proposed a Welch–Berlekamp-like decoder for Gabidulin codes and a Gröbner-basis-based decoder for interleaved Gabidulin codes [ 14 ].…”

“…For errors, the success probability is already and for , it is . A Gabidulin code as in [ 14 ], over the same ring and the same parameters, can correct any error of rank up to 30 (i.e., the same maximal radius). However, the currently fastest decoder for Gabidulin codes over rings [ 14 ] has a larger complexity than the LRPC decoder in Sect.…”

Low-rank parity-check codes over Galois rings

On the Generalizations of the Rank Metric over Finite Chain Rings

Low-rank parity-check codes over finite commutative rings