Sun-type determinant and permanent congruences

Abstract

Sun proposed a list of congruence and quadratic-residue conjectures for determinants and permanents over residue classes modulo a prime. This article gives a uniform treatment of Conjectures 4.6, 4.7, 4.8(ii), 4.9, 4.10(ii), 4.11 and 4.12 from Sun's list, while making explicit the overlap with two earlier contributions. Luo and Xia's Legendre-symbol formula for Dp(b,1) already implies the non-vanishing assertion in Conjecture 4.6 when p5 24; our determinant argument gives a root-quotient criterion for irreducible binary quadratic forms over and also covers the remaining case p19 24. For the Cauchy kernel 1/(x-y), we prove the derangement determinant and permanent congruences modulo p2 and a polynomial fixed-point permanent congruence modulo p. For the Cayley kernel (x+y)/(x-y), She, Sun and Xia's permanent identity supplies the structural input for the fixed-point permanent; combined with our Cauchy permanent congruence and Morley's congruence, it yields the congruence modulo p2. Independent interpolation arguments give the signed fixed-point determinant congruences and the quadratic-residue assertion for the signed derangement determinant. Finally, a local expansion at the unique zero eigenvalue proves the half-size quadratic Cayley determinant divisibility by p2, and by p3 when p78.