Sun-type determinant and permanent congruences
Abstract: Sun proposed a collection of congruence and quadratic-residue conjectures for determinants and permanents over residue classes modulo a prime. This article proves Conjectures 4.6, 4.7, 4.8(ii), 4.9, 4.10(ii), 4.11 and 4.12 from Sun's list. The determinant part is strengthened to a root-quotient criterion for irreducible binary quadratic forms over the quadratic extension of the prime field; the criterion gives the stated result for the determinant associated with the remaining binary quadratic form. The Cauchy-kernel part gives both derangement congruences modulo the square of the prime and a polynomial fixed-point permanent congruence modulo the prime. The Cayley-transform part gives the signed fixed-point determinant congruences, the quadratic-residue assertion for the signed derangement determinant, and the full fixed-point permanent congruence modulo the square of the prime. The half-size quadratic Cayley determinant is treated by a local expansion at a simple zero eigenvalue, giving divisibility by the square of the prime and, in the stronger congruence class, by its cube. The proofs combine finite-field diagonalisation, Cauchy cycle cancellation, matching expansions, interpolation, Morley's congruence and first nonzero determinant terms.
Paper Prompts
Sign up for free to create and run prompts on this paper using GPT-5.
Top Community Prompts
Collections
Sign up for free to add this paper to one or more collections.