Description This deposit contains the preprint manuscript and the complete computational laboratory for the analytical evaluation of the inverse fine-structure constant (^-1) formulated as a deterministic response of the quantum vacuum substrate (Modular Substrate Theory, MST). Conceptual Logic Rather than utilizing empirical data-fitting, this framework treats ^-1 as a renormalization flow originating from a pristine geometric manifold (4³ + ² +). This bare coupling is sequentially screened by the vacuum's fundamental informational impedance (R₅ₔ₍₃ = 2 / (6 3) ), which we derive from the Standard Model Z₆^ (1) global 1-form gauge symmetry and holographic Cantor string dynamics. Key Theoretical Components The Master Equation: We present a non-perturbative series: ^-1 Geometry - ₇₎₋₎₆ₑ₀₇₈₂ - ₓ₎ₑₒ₈₎₍₀₋. ^-1 (4³ + ² +) - R₅ₔ₍₃℃4 - (1 + 14) R₅ₔ₍₃⁵ Holographic Partitioning: Implements the Bekenstein-Hawking bound (1/4) projected onto the Z₆ partition space. Topological Scattering: Incorporates the vacuum manifold's torsional cross-section (1 + 1/4) as an infrared fixed-point correction at the fifth-order complexity scale (R₅ₔ₍₃⁵). Metrological Convergence: The formulation yields a result of 137. 035999206. . . , matching the CODATA 2022 baseline with a residual absolute deviation of 1. 5 10^-14. Computational Validation & Falsifiability To demonstrate that this convergence is not a "Look-Elsewhere Effect" (LEE) artifact, this repository provides a 100-digit precision computational audit. Stochastic Search Audit: Monte Carlo simulations (up to 10⁶ syntactic tree structures) confirm that the master equation constitutes a unique global minimum of algorithmic complexity. Non-Perturbative Stability Audit: We demonstrate that the model occupies a steep "phenomenological potential well. " Micro-perturbations (= 10^-6) to the input topological invariants (R₅ₔ₍₃ or the Z₆ scaling) cause the predictive accuracy to collapse by >10⁴ orders of magnitude, effectively falsifying the hypothesis of arbitrary parameter tuning. Contents AnalyticalEvaluationAlpha. pdf: Full manuscript submitted to PTEP (Paper ID: T06182). ValidationSuite. ipynb / ValidationSuite. pdf: Interactive environment for independent replication of all invariants and stochastic audit logs. AlgebraicNaturalness. png: Visual audit map illustrating the structural isolation of the MST result. Endorsement & Peer Review For colleagues in the High Energy Physics (hep-ph) community interested in providing an arXiv endorsement to support this submission, please utilize the following direct link: https: //arxiv. org/auth/endorse? x=JFXY7X Companion Foundational Work: The derivation of the invariants is detailed in Zenodo DOI: 10. 5281/zenodo. 20546608. Last Update: June 2026 | Status: Under Review (PTEP)
José Ignacio Peinador Sala (Wed,) studied this question.
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