Some cyclic codes of length ${8p^n}$ over $GF(q)$, where order of $q$ modulo $8p^n$ is $\frac{\phi{(p^n)}}{2}$ | Zendy

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Some cyclic codes of length ${8p^n}$ over $GF(q)$, where order of $q$ modulo $8p^n$ is $\frac{\phi{(p^n)}}{2}$

Author(s) -

Jagbir Singh,

Sonu Singh

Publication year - 2019

Publication title -

journal of mathematical and computational science

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.12

H-Index - 2

ISSN - 1927-5307

DOI - 10.28919/jmcs/4201

Subject(s) - mathematics , modulo , prime (order theory) , finite field , order (exchange) , prime power , combinatorics , type (biology) , primitive root modulo n , cyclic group , discrete mathematics , ecology , abelian group , finance , economics , biology

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