Proof of three conjectures on determinants related to quadratic residues

Abstract

In this paper we confirm three conjectures of Z.-W. Sun on determinants. We first show that any odd integer n>3 divides the determinant |(i2+dj2)(i2+dj2n)|0 i,j (n-1)/2, where d is any integer and (·n) is the Jacobi symbol. Then we prove some divisibility results concerning |(i+dj)n|0 i,j n-1 and |(i2+dj2)n|0 i,j n-1, where d=0 and n>2 are integers. Finally, for any odd prime p and integers c and d with p cd, we determine completely the Legendre symbol (Sc(d,p)p), where Sc(d,p):=|(i2+dj2+cp)|1 i,j(p-1)/2.