Radial Integration in Continuous Dimension: A Mellin-Gamma Classification of Euclidean Ball Volume

Abstract

We classify positive linear functionals on Cc(R>0) satisfying scaling covariance of degree x/2 and Gaussian normalization to πx/2. We prove that the unique such functionals are represented by the Mellin--Gamma measures \[ dμx(u) = πx/2(x/2)\, ux/2 - 1\, du, x > 0. \] The result is a rigidity statement: the Mellin--Gamma structure is forced by the axioms, without assuming analytic continuation, special functions, or a priori formulas. The proof reduces the scaling condition, via a logarithmic change of variables, to translation invariance on R, where Haar measure uniqueness determines the measure up to normalization, which is fixed by the Gaussian integral. As a consequence, the Euclidean ball volume formula \[ V(x) = πx/2(x/2 + 1) \] is recovered as the mass of the unit interval. We further analyze the induced dimension-shift structure, identifying two multiplicative cocycles whose ratio is a coboundary given by the dimension function x, and give an independent characterization via a shifted Bohr--Mollerup theorem.