Order-Moment Transport and Hankel Determinants in Special-Function Inequalities

Abstract

Scalar inequalities in an order parameter often arise as the 2×2 shadow of a stronger Hankel determinant statement. We record a moment-representation criterion: positive exponential and Mellin order representations, together with gamma-normalized completely monotone averages, generate totally nonnegative Hankel kernels, with strictness controlled by the support of the representing measure. The criterion packages the classical total-positivity mechanism as a recognition calculus for special-function inequalities, turning the order parameter into a moment exponent after the correct normalization. The applications include three named determinant lifts. First, we prove the positive Jackson q-gamma Hankel conjecture of Karp--Vishnyakova--Zhang: for 0<q<1, the kernel (x,y)Γq(x+y) is STP∞. This is an atomic Mellin-moment instance of the general criterion; the reciprocal sign-regularity problem for 1/Γq is separate and is not addressed here. Second, we answer Yang's continuous half-gamma Mills-ratio log-convexity question and strengthen it to strict total positivity, hence to all higher Hankel Turan determinants. Third, we treat Tricomi rays and the one-dimensional Coulomb regularization as all-minor Hankel determinant hierarchies. For the Coulomb regularization, the 2×2 minor gives the scalar log-convexity question recorded by Baricz--Pogany, and the full theorem supplies the corresponding all-minor strengthening.

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