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Sun-type determinant and permanent congruences

Published 19 May 2026 in math.NT | (2605.19502v1)

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.

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