Additive Complementary Pairs of Codes
Abstract
An additive code is an Fq-linear subspace of Fqmn over Fqm, which is not a linear subspace over Fqm. Linear complementary pairs (LCP) of codes have important roles in cryptography, such as increasing the speed and capacity of digital communication and strengthening security by improving the encryption necessities to resist cryptanalytic attacks. This paper studies an algebraic structure of additive complementary pairs (ACP) of codes over Fqm. Further, we characterize an ACP of codes in analogous generator matrices and parity check matrices. Additionally, we identify a necessary condition for an ACP of codes. Besides, we present some constructions of an ACP of codes over Fqm from LCP codes over Fqm and also from an LCP of codes over Fq. Finally, we study the constacyclic ACP of codes over Fqm and the counting of the constacyclic ACP of codes.
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