Several classes of optimal p-ary cyclic codes with minimal distance four

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 p 5 be an odd prime and m be a positive integer. Let C(1,e,s) denote the p-ary cyclic code with three nonzeros α, αe, and αs, where α is a generator of Fpm*, s=pm-12, and 2 e pm-2. In this paper, we present four classes of optimal p-ary cyclic codes C(1,e,s) with parameters [pm-1,pm-2m-2,4] by analyzing the solutions of certain polynomials over finite fields. Some previous results about optimal quinary cyclic codes with parameters [5m-1,5m-2m-2,4] are special cases of our constructions. In addition, by analyzing the irreducible factors of certain polynomials over F5m, we present two classes of optimal quinary cyclic codes C(1,e,s).