A Projection-Dimension Barrier for Direct Aggregation on the Step-Duplicating Primitive Recursor

We identify \emph{operational inexpressibility}: for a fixed input and dimension of term-rewriting proof systems, no derivation in the proof language both depends on that dimension and constrains the target question. The canonical instance is direct aggregation on the primitive-recursion duplicator $F(x,y,Z)\to x$, $F(x,y,S(n))\to G(y,F(x,y,n))$, where step argument $y$ is duplicated. Sound responses split into \emph{construction methods} (polynomial interpretations, path orderings) extending the proof language, and \emph{confession methods} (dependency pairs, counter-projection, size-change, argument filtering) projecting the unincorporable dimension under external license; all four share one projection rank and certified-forgetting witness. The Arts-Giesl license is $Π^0_2$, formalizable in $\mathrm{I}Σ_1$, with termination measure at order type $ω^3$ in $\mathrm{RCA}_0$. Within the analyzed family the duplicator is the unique structurally complete member at which the confession becomes load-bearing. Confessed burden grows quadratically across the canonical trace while residual proof work grows linearly; a Shannon-style validator recasts the obstruction as a divergent inefficiency coefficient. An architectural-necessity theorem shows that any first-order step rule emitting a per-step record frame while preserving its generator must duplicate, so the duplicator is the minimal faithful record-emitter. A \emph{layer-crossing under external license} (LCEL) schema abstracts the ascent pattern and places the confession in the Feferman-Beklemishev reflection family (not Lawvere-Yanofsky diagonal), recovering the six-step structural identity with Gödel 1931. A witness-language stratification with minimal order $κ^*$ marks the orientation boundary as $κ^*(x)>0$. Mechanized in Lean 4 as a single typed LCEL carrier with canonical Gödel / DP realizations.