On p-th cyclotomic field and cyclotomic matrices involving Jacobi sums

Abstract

Inspired by Weil's classical result on the zeta function of projective Fermat curve defined over a finite field, in this paper, we investigate some arithmetic properties of the cyclotomic matrix [Jp(ki,kj)]1 i,j n-1, where p3 is a prime, 1 k<p-1 is a divisor of p-1 with p-1=kn, is a generator of the group of all multiplicative characters of Fp and Jp(ki,kj) is the Jacobi sum. For example, let ζp∈C be a primitive p-th root of unity and Pk(T) be the minimal polynomial of the algebraic integer θk=Σx∈Fp,xk=1ζpx over Q. Then we prove that [Jp(ki,kj)]1 i,j n-1=(-1)(k+1)(n2-n)2· nn-2· xp(k), where xp(k) is the coefficient of T in Pk(T).