Bell-type experiments are the most precisely tested quantum mechanical predictions and the most frequently cited evidence for non-locality in physics. This paper derives the quantum mechanical correlation function E (a, b) = −cos (θₐb) for spin-½ particle pairs in the singlet state from the first principles of Quantum-Geometry Dynamics (QGD), without invoking non-locality, without treating the Born rule as a primitive, and without positing any causal layer above the preonic level. The derivation proceeds in two stages. The first establishes four symmetry constraints that any preonic account of spin-½ must satisfy: rotational isotropy of the preonic structure of space, the zero-total-momentum condition defining the singlet state in preonic terms, the binary outcome constraint, and conservation of intrinsic momentum between creation and measurement. These constraints are necessary conditions derived from the three QGD axioms and are shown to be sufficient to determine the correlation function uniquely given a specified measurement weighting function P (+1|θ). The second stage demonstrates that the p-gravity binding structure of a spin-½ preonic aggregate naturally produces an internal angular distribution of preon (+) momentum directions — proposed as f (α) ∝ (1 + cosα) — that leads to the measurement weighting function P (+1|θ) = cos² (θ/2). Given this weighting, and conditional on the companion calculation establishing that the (1 + cosα) p-gravity distribution supplies the factor-of-3 required to pass from the naive spherical integral result − (1/3) cosθ₀₁ to the full cosine correlation, the four symmetry constraints yield E (a, b) = −cos (θₐb) and the Tsirelson bound of 2√2 follows as a geometric consequence. The full derivation of P (+1|θ) = cos² (θ/2) from p-gravity equilibrium requires the particle formation account of the QGD book as input and is identified as the subject of a companion calculation. Three extensions beyond the idealised case are developed. First, what is measured in Bell experiments are objects in the sense of the Physicality of Scales: structures whose response to any force is entirely describable by total mass and resultant momentum vector. The Definition of Object justifies treating the resultant P⃗₁ as the relevant measurement quantity and explains why the internal preon (+) degrees of freedom are not independently accessible to the detector. Second, the p-gravity coupling geometry is determined by the particle's mass-velocity regime: p-gravity couples at very low angles over long, potentially galactic-scale distances, and the coupling profile for each particle type determines its internal preon (+) distribution and hence the form of P (+1|θ). The companion calculation must derive this profile from the book's particle formation account. Third, no Bell experiment is perfectly isolated from the n-gravity field of distant matter distributions. This field introduces a small systematic perturbation to the particles' resultant momenta during transit, producing a deviation from the ideal cosine correlation: E (a, b) = −cos (θₐb) + ε, where ε depends on transit geometry, local preonic field density, and the cosmological expansion state. This constitutes a testable signature prediction distinguishing QGD from standard quantum mechanics, in principle observable at sufficiently long baselines or in cosmological Bell experiments. Bell's theorem is satisfied in QGD for a precise reason: the preonic configurations of the two particles are correlated from creation through the shared causal history of the source interaction, violating the statistical independence assumption of Bell's theorem — but without any non-local influence at the moment of measurement. The account is fully local and fully deterministic. The paper compares this account with Bohmian mechanics (which achieves local determinism through a non-local pilot wave that QGD does not require), retrocausal models (which violate the temporal arrow that QGD preserves), and the many-worlds interpretation (which posits an ontological surplus that QGD avoids by treating superposition as epistemic). The refutation of top-down causation established in the Axiomatic Localism paper closes one further interpretational option: the possibility that macro-level causal autonomy could provide a non-preonic mechanism for producing the correlations. No such mechanism is admissible in QGD. The measurement setting influences the outcome only through the local preonic field interaction of the detector with the particle, and the experimenter's deliberative state is itself a preonic configuration whose causal effects are mediated entirely by local preonic interactions. The Bell correlations arise entirely from the preonic initial conditions established at the source, preserved by the deterministic causal succession, and revealed by local measurements. The standard Bell loopholes are examined in the preonic framework. The locality loophole is irrelevant by construction. The detection loophole does not arise at the fundamental preonic level. The freedom loophole is addressed by the Axiomatic Localism refutation: measurement settings are preonic configurations causally connected to the source only through the ordinary causal history of the universe, with no special non-local channel.
Daniel Burnstein (Tue,) studied this question.