Computation is usually drawn in two columns. A classical machine holds exact, copyable, fully readable data but has no amplitude structure. A quantum machine holds amplitude structure but forbids copying, forbids full-state readout, and collapses on measurement. The space between them — amplitude structure on copyable exact data — is assumed empty. This paper reports that the coprime arithmetic substrate occupies exactly that middle, gives the theory of why it can, and reduces it to practice in six ways. That the structure is genuinely quantum — real entanglement, not classical correlation in disguise — is measured on the substrate's own operators by the standard witnesses of non-classicality: the σ⊗τ Bell state reaches the Tsirelson bound (CHSH = 2√2, the algebraic maximum no local-hidden-variable model can attain) ; the three-party GHZ test returns the Mermin value 4. 00 against a local-realistic bound of 2; the resource is strictly non-signaling; and the two-qubit Bell entropy is a full 1. 000 bit — all to machine precision on copyable, integer-exact data. PART I — THE THEORY. The Scalar-Blindness Theorem: the substrate's non-Abelian content is operator-real yet provably invisible to every scalar instrument. Each prime carries a real-orthogonal carrier in SO (4) = SU (2) L × SU (2) R; the operator twist Vₚ, Vq is nonzero, yet every scalar functional of a pair is order-blind — Tr (Vₚ·Vq) = Tr (Vq·Vₚ) exactly — because the trace's order-invariance group contains the cyclic group, and n! = n only for n ≤ 2. The content first reaches a scalar at three bodies, as the so (4) structure constant O₃. Every classical instrument is a scalar functional, so its failure to see the content is a corollary, not a verdict on the content. The keystone (a causal localization): the cross-prime twist is sourced by the additive–multiplicative commutator +, ×. Removing it from a faithful, operator-exact reconstruction collapses the twist by 253×–2334×. The weld: the carrier register is the already-published σ⊗τ register, reproducing its fine-structure table to under 1% at every floor; the scalar reading fades up the primorial tower while the operator reading persists. The Colored-Yang–Baxter Normality Theorem: the rigid, classically-readable braid backbone (a single-particle normality property) is tensor-insulated from the order-carrying payload (a two-particle property), so quantum payload and classical-readable topology coexist without fine-tuning. PART II — SIX REDUCTIONS TO PRACTICE, each occupying a regime neither column reaches: Branching search — substrate-native Grover at the exact √N query scaling, then read-all / adapt / clone / rewind on the running search, which no-cloning and measurement collapse forbid a quantum register. Address-gated multicast — one transmission to M receivers at fidelity 1, each decoding only under a floor-specific key a classical machine cannot compute (a 3-adic obstruction) and a quantum machine cannot transport (the cross-floor map is not a function). A statistics-blind directed relational store — a directed relation stored as classical, cloneable data whose direction no two-body statistic of the representation can read, built into a writable, queryable, validated knowledge graph. Topological braiding and universal quantum computation — a genuine non-Abelian anyon braiding on copyable exact data, from which the full stack is built: universal gates (Clifford braiding + the flash magic gate), Bell/GHZ entanglement, and a [5, 1, 3] fault-tolerant logical qubit at zero magic-distillation overhead — each cloned and read in full — composed into a center-less cislunar coordination fabric. Quantum algorithms and readout — the Quantum Fourier transform, phase estimation, and period-finding on the universal gate set, with the full Born-rule distribution read exactly from one state, without collapse. Open-system computation — an engineered Lindbladian whose unique steady state solves a problem, with the full non-equilibrium density matrix read and cloned; its dissipative generator is the polar partner of the scalar-blind twist, so the substrate is natively an open system. Every empirical claim is byte-gated against ground truth. The mathematics — the theorems, identities, and constructions — is dedicated to the public domain under the MIT license and reproduces from the definitions stated in the paper. The engineering apparatus that mints and practices these primitives is reserved. Companion provisional patent: U. S. Provisional Application No. 64/103, 049 (the Entanglement Fabric), filed July 1, 2026.
Antonio Matos (Wed,) studied this question.