The Parabolic Mellin Transform: Gamma and Zeta Integral Representations

Abstract

We introduce the Parabolic Mellin Transform (PMT), defined by Pσ[f](z)=∫-∞∞w2zf(w2)dt, where w=σ+it and σ>0. Under the substitution u=w2, the vertical line Re(w)=σ is mapped to the parabolic contour Cσ in the u-plane. For the Gaussian kernel, the PMT yields ∫-∞∞w2zew2dt=π/Γ(12-z)=(πz)Γ(z+12), a parabolic-contour form of the classical Hankel representation for the reciprocal Gamma function. The advantage of this parametrization is that the contour integral becomes a Gaussian-damped vertical-line integral. We develop scaling, differentiation, and Dirichlet-composition identities for the PMT and use them to derive integral representations of the Hurwitz zeta, Riemann zeta, and Dirichlet eta functions. The framework provides a unified transform dictionary for Gamma-type and zeta-type special functions and yields equivalent reformulations of the Riemann hypothesis and the Lindelöf hypothesis in terms of zeros and growth of parabolic-contour integrals.