The Dimension-Shift Category and Its Mellin-Gamma Representation

Abstract

We define a thin category Dim+ of dimension shifts and a category RadMeas of positive Radon measures with Radon--Nikodym density morphisms. We classify scaling-covariant functors Dim+ whose morphisms are given by homogeneous densities. Gaussian normalization selects a unique functor with values dμx(u)=πx/2(x/2)ux/2-1\,du. Its morphism component yields the radial-integration transport R(x,r)=πr(x/2)(x/2+r), while the unit-interval observable recovers the Euclidean ball-volume formula V(x)=πx/2(x/2+1). The two transports differ by the multiplicative coboundary of β(x)=x, identified with the categorical dimension of the standard object in Deligne's interpolation category Rep(Ot).