G-Codes, self-dual G-Codes and reversible G-Codes over the Ring Bj,k
AffiliationTarsus University; University of Chester
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AbstractIn this work, we study a new family of rings, Bj,k, whose base field is the finite field Fpr . We study the structure of this family of rings and show that each member of the family is a commutative Frobenius ring. We define a Gray map for the new family of rings, study G-codes, self-dual G-codes, and reversible G-codes over this family. In particular, we show that the projection of a G-code over Bj,k to a code over Bl,m is also a G-code and the image under the Gray map of a self-dual G-code is also a self-dual G-code when the characteristic of the base field is 2. Moreover, we show that the image of a reversible G-code under the Gray map is also a reversible G2j+k-code. The Gray images of these codes are shown to have a rich automorphism group which arises from the algebraic structure of the rings and the groups. Finally, we show that quasi-G codes, which are the images of G-codes under the Gray map, are also Gs-codes for some s.
CitationDougherty, S., Gildea, J., Korban, A., & Sahinkaya, S. (2021). G-Codes, self-dual G-Codes and reversible G-Codes over the Ring Bj,k. Cryptography and Communications, https://doi.org/10.1007/s12095-021-00487-x.
JournalCryptography and Communications
DescriptionThe final publication is available at Springer via http://dx.doi.org/https://doi.org/10.1007/s12095-021-00487-x
Except where otherwise noted, this item's license is described as https://creativecommons.org/licenses/by-nc-nd/4.0/