Analytic Uniqueness of Ball Volume Interpolation: Categorical Invariance and Universal Characterization

We show that the classical volume formula for the unit $x$-ball, \[ V_x = \frac{π^{x/2}}{Γ(x/2+1)}, \] can be characterized as the \emph{unique} analytic continuation of Haar measure normalization and unit ball volumes for $\mathrm{O}(n)$, under principles of categorical invariance and normalization at integer dimensions. We generalize this result to the unitary and symplectic cases, formalize invariance using categorical language, and construct explicit categorical examples with functorial diagrams. This perspective positions $V_x$ and its analogues as canonical analytic objects at the interface of analysis, representation theory, and category theory, and motivates a broader program of exploring categorical invariants for interpolated symmetry.