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The Holographic Geometric-Refractive Unification in the Era of High-Precision Lattice QCD: Reconciling the 95.4 GeV Dilaton with the Standard Model Muon g−2 Resolution

Author:

Hofseth, Jesse D.

Category:

Research Papers

Sub-Category:

Gravity

Language:

English

Date Published:

April 24, 2026

File:

/Research Papers-Gravity/Download/10530

Downloads:

Keywords:

QCD, 95~GeV Resonance, Dilaton, Holographic Principle, Geometric Unity, Refractive Vacuum Gravity, Koide Formula, Geometric g-2, 14D Observerse, Topological Phase Transition, Metric Engineering

Abstract:

On April 22, 2026, Fodor et al. published in Nature a hybrid lattice QCD calculation of the LO-HVP contribution to the muon anomalous magnetic moment: aμ^LO-HVP = 715.1(2.5)(2.3)[3.4] × 10^{-10} at 0.48% precision. This resolves the two-decade muon g-2 anomaly, aligning the Standard Model prediction with Fermilab data to within 0.5σ and validating the SM to eleven decimal places, excluding BSM contributions at O(10^{-10}). This explores implications for the holographic Geometric-Refractive Unification (GU-RVG) framework, which posits a 95.4 GeV dilaton mediating conformal symmetry breaking in a 14D Observerse and interprets the 9.25 ppm Koide deviation as a Geometric g-2. We show the Nature result does not falsify the model. It instead sets a lower bound on the dilaton decay constant f_φ via the 1-loop scalar contribution Δa_μ^φ ∝ m_μ²/(8π² f_φ²). The GU-RVG value f_φ ≈ 27.2 TeV (from S^5 topology and Koide shift) yields Δa_μ^φ ~ O(10^{-11}), at the exascale limit, thus surviving and validated by the result. The Geometric g-2 is orthogonal to QED/QCD loops, from bulk geometry. Finally, SM perturbative closure prohibits brute-force metric engineering below the Schwinger limit, elevating the GU-RVG Topologically Induced Phase Transition—where MADA-generated magnetic helicity couples to bulk Chern-Simons terms, condensing the dilaton into an N²-scaling holographic superconductor—as the sole viable route to macroscopic vacuum manipulation.