Exponential Sums, Cyclic Codes and Sequences: the Odd Characteristic Kasami Case

Abstract

Let q=pn with n=2m and p be an odd prime. Let 0≤ k≤ n-1 and k≠ m. In this paper we determine the value distribution of following exponential(character) sums \[Σx∈ qζp1m (α xpm+1)+1n(β xpk+1)(α∈ pm,β∈ q)\] and \[Σx∈ qζp1m (α xpm+1)+1n(β xpk+1+ x)(α∈ pm,β,∈ q)\] where 1n: q p and 1m: pmp are the canonical trace mappings and ζp=e2π ip is a primitive p-th root of unity. As applications: (1). We determine the weight distribution of the cyclic codes 1 and 2 over pt with parity-check polynomials h2(x)h3(x) and h1(x)h2(x)h3(x) respectively where t is a divisor of d=(m,k), and h1(x), h2(x) and h3(x) are the minimal polynomials of π-1, π-(pk+1) and π-(pm+1) over pt respectively for a primitive element π of q. (2). We determine the correlation distribution among a family of m-sequences. This paper extends the results in Zen Li.