Several new classes of optimal ternary cyclic codes with two or three zeros

Abstract

Cyclic codes are a subclass of linear codes and have wide applications in data storage systems, communication systems and consumer electronics due to their efficient encoding and decoding algorithms. Let α be a generator of F3m*, where m is a positive integer. Denote by C(i1,i2,·s, it) the cyclic code with generator polynomial mαi1(x)mαi2(x)·s mαit(x), where mαi(x) is the minimal polynomial of α i over F3. In this paper, by analyzing the solutions of certain equations over finite fields, we present four classes of optimal ternary cyclic codes C(0,1,e) and C(1,e,s) with parameters [3m-1,3m-3m2-2,4], where s=3m-12. In addition, by determining the solutions of certain equations and analyzing the irreducible factors of certain polynomials over F3m, we present four classes of optimal ternary cyclic codes C(2,e) and C(1,e) with parameters [3m-1,3m-2m-1,4]. We show that our new optimal cyclic codes are inequivalent to the known ones.

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