On some determinants involving Jacobi symbols

Abstract

In this paper we study some conjectures on determinants with Jacobi symbol entries posed by Z.-W. Sun. For any positive integer n34, we show that (6,1)n=[6,1]n=(3,2)n=[3,2]n=0 and (4,2)n=(8,8)n=(3,3)n=(21,112)n=0 as conjectured by Sun, where (c,d)n=|(i2+cij+dj2n)|1 i,j n-1 and [c,d]n=|(i2+cij+dj2n)|0 i,j n-1 with (·n) the Jacobi symbol. We also prove that (10,9)p=0 for any prime p512, and [5,5]p=0 for any prime p 13,1720, which were also conjectured by Sun. Our proofs involve character sums over finite fields.