The Gross-Koblitz formula and almost circulant matrices related to Jacobi sums

Abstract

In this paper, we mainly consider arithmetic properties of the cyclotomic matrix Bp(k)=[Jp(ki,kj)-1]1 i,j (p-1-k)/k, where p is an odd prime, 1 k<p-1 is a divisor of p-1, is a generator of the group of all multiplicative characters of the finite field Fp and Jp(ki,kj) is Jacobi sum over Fp. By using the Gross-Koblitz formula and some p-adic tools, we first prove that pn-2 Bp(k) (-1)(n-1)(p+n-3)2 (1k!)n-21(2k)! p, where p-1=kn. By establishing some theories on almost circulant matrices, we show that Bp(k)=(-1)(n-1)(p+n-1)2p-(n-1)nn-2ap(k). Here ap(k) is the coefficient of t in the minimal polynomial of Σy∈ Uk(e2π iy/p-1), where Uk is the set of all k-th roots of unity over Fp. Also, for k=1,2 we obtain explicit expressions of Bp(k).