This preprint introduces a family of signed Schur-minor defect expressions motivated by Toeplitz/Pólya-frequency Jacobi-Trudi minors. The paper studies a boundary-absorbed global curvature mechanism on an A2-lattice strip, showing that local positivity routes are structurally inadequate: the relevant defect is not Schur-positive, its transverse second differences are not pointwise nonnegative, and fixed local endpoint absorption is too strong. The main endpoint gate is reduced by Pieri expansion to an explicit finite Schur-function expression built from three-column families. In conjugate coordinates, the local defect becomes a transverse second difference, giving an integrated A2-curvature interpretation. Under principal specialization, the paper proves a baseline hook-content skeleton theorem, a universal width-three cancellation factor, endpoint asymptotic cancellation certificates, and a positive centered content-moment identity. The endpoint product factorization is obtained conditionally on a finite-band cancellation identity. The manuscript also formulates a stronger prefix shifted-residual positivity conjecture. Exact symbolic checks are included for the endpoint product formula, finite-band identities, and prefix shifted-residual nonnegativity over the stated finite ranges. No claim about the Riemann Hypothesis is made.
Alexandre Dumas (Sat,) studied this question.