Asymptotic Hyperbolicity of Jensen Polynomials and the Finite-Strip Obstruction to the Riemann Hypothesis

We study the degree-d Jensen polynomials Jd,n(X) built from the moment sequence Mn=∫0∞Φ1(u)u2ndu of the Riemann Ξ-function, which coincides with the classical Pólya–Jensen family. Using bridge coordinates, the staircase law, and Plancherel–Rotach asymptotics, we prove that Jd,nγ is hyperbolic for all n≥C0∞d4 (C0∞≈0.020; the analytic formula for C0∞ is rigorous but agrees with the numerically observed value to within 2.6%); combined with the GORZ theorem for d≤8, this covers the entire asymptotic regime. We identify a phase-transition law n*(d)=C0∞d4+αd3+β(−1)dd2+O(d): the leading constant C0∞≈0.0195 is computed analytically and verified to within 2.6% of the empirical large-d limit; the formula for α is derived; its numerical value of ≈−0.2 to −0.3 is numerical evidence; the parity structure β(−1)dd2 is proved. For the finite strip 0≤n0 for all d≥9 and 0≤n<C0∞d4; this requires moment data Mk for k≥130, which are currently inaccessible.