Enumeration of Cyclic Codes Over GF(23)

Simatwo, Kimtai Boaz and Mati, Runji Flora and Karieko, Obogi Robert (2023) Enumeration of Cyclic Codes Over GF(23). Journal of Advances in Mathematics and Computer Science, 38 (9). pp. 194-206. ISSN 2456-9968

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Official URL: https://doi.org/10.9734/jamcs/2023/v38i91815

Abstract

In this paper, we investigate the number of irreducible polynomials of -1over GF(23). First, We factorize -1 into irreducible polynomials over GF(23) using the cyclotomic cosets of 23 modulo . The number of irreducible polynomial factors of -1 over GF(23) is equal to the number of cyclotomic cosets of 23 modulo n and each monic divisor of -1 is a generator polynomial of cyclic codes in GF(23). Succeedingly, we confirm that the number of cyclic codes of length over finite field GF(23) is equivalent to the number of polynomials that divide -1.

Item Type:	Article
Subjects:	GO for STM > Mathematical Science
Depositing User:	Unnamed user with email support@goforstm.com
Date Deposited:	18 Sep 2023 10:56
Last Modified:	18 Sep 2023 10:56
URI:	http://archive.article4submit.com/id/eprint/1483

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