Several new classes of optimal p-ary cyclic codes

Abstract

Cyclic codes, as a crucial subclass of linear codes, exhibit broad applications in communication systems, data storage systems, and consumer electronics, primarily attributed to their well-structured algebraic properties. Let p denote an odd prime with p≥5, and let m be a positive integer. The primary objective of this paper is to construct three novel classes of optimal p-ary cyclic codes, denoted as Cp(0,s,t), which possess the parameters [pm - 1,pm - 2m - 2,4]. Here, s is defined as s = pm+12, and t satisfies the condition 2 t pm - 2. Notably, one of the constructed classes includes certain known optimal quinary cyclic codes as special cases. Furthermore, for the specific case when p=5, this paper additionally presents four new classes of optimal cyclic codes C5(0,s,t).