A Determinant Congruence Conjectured by Sun

Abstract

We prove a strengthened form of a conjecture of Sun on a determinant attached to a binary quadratic form. Let n>3 and let c,d∈. If n is composite, then \[ [(i2+cij+dj2)n-2]0≤ i,j≤ n-1 0 n2 \] with no condition on c and d. If n=p is prime, the same congruence holds whenever the Legendre symbol dp is -1. For composite n, a polynomial determinant is divisible by two Vandermonde factors; after specialisation, their product already yields the required square divisor. For prime n=p, we estimate the rank of the matrix modulo p. The required rank defect follows from a coefficient cancellation obtained from the involution t d/t on × and the condition dp=-1.