We present a non-perturbative, deterministic unification that merges Albert Einstein’s classical field equations with the 6D Hydrodynamic Viscous Head Loss model of the Summa Teorica. By replacing abstract, empty space-time geometry with a physical, active, conducting vacuum, we demonstrate that gravitational acceleration and metric curvature are secondary macroscopic phenomena generated by the frictional drag of Current I filtering through a two-dimensional pre-Planckian simplicial membrane (\ (M₆₃\) ). We solve the specific boundary conditions for a static, spherically symmetric central mass \ (M\), proving that the resulting inverse pressure gradients match the exact geodesics of the classical Schwarzschild metric with mathematical equivalence (\ (V (P/) ₄₈₍ₒₓ₄₈₍\) ). Furthermore, we establish the definitive experimental protocol to verify this trans-membrane phase transition at room temperature (\ (293 K\) ) by exploiting the topological properties of Ditelurio de Uranio (\ (UTe₂\) ) and Nickelates (\ (La₃Ni₂O₇\) ) under a coherent \ (10. 00 MHz\) radiofrequency excitation loop. The framework successfully derives the predictable, stepwise conformal mass reduction of exactly \ (0. 045\%\) (\ (_ = 0. 00045\) ), closing the ontological gap between fluid mechanics, particle physics, and general relativity.
rodrigo javier vidal (Tue,) studied this question.
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