A Generalization of the ASR Search Algorithm to 2-Generator Quasi-Twisted Codes

One of the main goals of coding theory is to construct codes with best possible parameters and properties. A special class of codes called quasitwisted (QT) codes is well-known to produce codes with good parameters. Most of the work on QT codes has been over the 1-generator case. In this work, we focus on 2-generator QT codes and generalize the ASR algorithm that has been very effective to produce new linear codes from 1-generator QT codes. Moreover, we also generalize a recent algorithm to test equivalence of cyclic codes to constacyclic codes. This algorithm makes the ASR search even more effective. As a result of implementing our algorithm, we have found 103 QT codes that are new among the class of QT codes. Additionally, most of these codes possess the following additional properties: a) they have the same parameters as best known linear codes, and b) many of the have additional desired properties such as being LCD and dual-containing. Further, we have also found a binary 2-generator QT code that is new (record breaking) among all binary linear codes [1] and its extension yields another record breaking binary linear code.

[1]  Nuh Aydin,et al.  New quinary linear codes from quasi-twisted codes and their duals , 2011, Appl. Math. Lett..

[2]  R. Daskalov,et al.  Some new ternary linear codes , 2017 .

[3]  Markus Grassl,et al.  Some results on the structure of constacyclic codes and new linear codes over GF(7) from quasi-twisted codes , 2017, Adv. Math. Commun..

[4]  Alexander Vardy,et al.  The intractability of computing the minimum distance of a code , 1997, IEEE Trans. Inf. Theory.

[5]  Nuh Aydin,et al.  On equivalence of cyclic codes, generalization of a quasi-twisted search algorithm, and new linear codes , 2019, Des. Codes Cryptogr..

[6]  Nuh Aydin,et al.  A generalization of cyclic code equivalence algorithm to constacyclic codes , 2021, Designs, Codes and Cryptography.

[7]  Vijay K. Bhargava,et al.  Two new rate 2/p binary quasi-cyclic codes , 1994, IEEE Trans. Inf. Theory.

[8]  N. Aydin,et al.  Some generalizations of the ASR search algorithm for quasitwisted codes , 2020 .

[9]  Nuh Aydin,et al.  A New Algorithm for Equivalence of Cyclic Codes and Its Applications , 2021, Applicable Algebra in Engineering, Communication and Computing.

[10]  R. Daskalov,et al.  Some new quasi-twisted ternary linear codes , 2015 .

[11]  Eric Z. Chen An Explicit Construction of 2-Generator Quasi-Twisted Codes , 2008, IEEE Trans. Inf. Theory.

[12]  Dwijendra K. Ray-Chaudhuri,et al.  The Structure of 1-Generator Quasi-Twisted Codes and New Linear Codes , 2001, Des. Codes Cryptogr..

[13]  Rumen N. Daskalov,et al.  New quasi-twisted degenerate ternary linear codes , 2003, IEEE Trans. Inf. Theory.

[14]  Irfan Siap,et al.  New quasi-cyclic codes over F5 , 2002, Appl. Math. Lett..