Abstract This paper completes the Möbius LC framework by identifying gravity not as a fundamental force, but as the spatial distribution of the inductive field. We derive the equivalence principle and general relativity as natural consequences of Möbius topology. Key Findings Gravity as Field Gradient: Gravity is the gradient of the Time-Gravity Axis (TGA) projection density. It is a static field distribution, not an exchange process, implying that gravitons do not exist. g = -₆ The Equivalence Principle: We prove that inertial mass (inductance L) and gravitational mass (TGA projection ₆) are identical because they arise from the same unpaired antinode in the inner Möbius layer. m₈₍₄ₑₓ₈₀₋ = m₆ₑ₀ₕ₈ₓ₀ₓ₈₎₍₀₋ Only Attraction: The unidirectionality of the TGA axis (₆ 0) ensures that gravity is always attractive. Negative mass is topologically forbidden. Dissolving the Hierarchy Problem: The 10^40 strength difference between gravity and electromagnetism is shown to be a category error arising from comparing a dimensionless coupling () to a dimensional field strength (G₍). Conclusion By reclassifying gravity as a static topological property, we resolve the conflicts between quantum mechanics and general relativity without the need for a quantized gravitational field.
Zheng Yan (Mon,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: