On finite field analogues of determinants involving the Beta function

Abstract

Motivated by the works of L. Carlitz, R. Chapman and Z.-W. Sun on cyclotomic matrices, in this paper, we investigate certain cyclotomic matrices concerning the Jacobi sums over finite fields, which can be viewed as finite field analogues of certain matrices involving the Beta function. For example, let q>1 be a prime power and let be a generator of the group of all multiplicative characters of Fq. Then we prove that [Jq(i,j)]1 i,j q-2=(q-1)q-3, where Jq(i,j) is the Jacobi sum over Fq. This is a finite analogue of [B(i,j)]1 i,j n=(-1)n(n-1)2Πr=0n-1(r!)3(n+r)!, where B is the Beta function. Also, if q=p5 is an odd prime, then we show that [Jp(2i,2j)]1 i,j (p-3)/2=1+(-1)p+12p4(p-12)p-52.