On the weight distributions of several classes of cyclic codes from APN monomials

Abstract

Let m≥ 3 be an odd integer and p be an odd prime. % with p-1=2rh, where h is an odd integer. In this paper, many classes of three-weight cyclic codes over Fp are presented via an examination of the condition for the cyclic codes C(1,d) and C(1,e), which have parity-check polynomials m1(x)md(x) and m1(x)me(x) respectively, to have the same weight distribution, where mi(x) is the minimal polynomial of π-i over Fp for a primitive element π of Fpm. %For p=3, the duals of five classes of the proposed cyclic codes are optimal in the sense that they meet certain bounds on linear codes. Furthermore, for p 3 4 and positive integers e such that there exist integers k with (m,k)=1 and τ∈\0,1,·s, m-1\ satisfying (pk+1)· e 2 pτpm-1, the value distributions of the two exponential sums T(a,b)=Σx∈ Fpmω(ax+bxe) and S(a,b,c)=Σx∈ Fpmω(ax+bxe+cxs), where s=(pm-1)/2, are settled. As an application, the value distribution of S(a,b,c) is utilized to investigate the weight distribution of the cyclic codes C(1,e,s) with parity-check polynomial m1(x)me(x)ms(x). In the case of p=3 and even e satisfying the above condition, the duals of the cyclic codes C(1,e,s) have the optimal minimum distance.