Section 6.10 presents a formal consolidation of the Mass Curvature Rate (MCR) framework as a unit-consistent mass formulation and clarifies its algebraic relationship to the MUT expression. The section demonstrates that the core MCR equation yields mass strictly in SI units without auxiliary normalization factors, confirming dimensional closure of the theory.An equivalence condition between the MCR and MUT mass expressions is derived by equating their functional forms and eliminating common variables. This leads to a direct proportionality between the effective scalar field constant and the ratio of the Rydberg frequency to the Mass Curvature Rate constant. The result establishes a transparent parameter correspondence rather than introducing an independent degree of freedom.The analysis emphasizes that the mass number remains dimensionless while the curvature-rate constant governs the conversion between geometric curvature and physical mass. The derived relation reveals how atomic-scale constants and curvature-based parameters can be expressed within a single algebraic structure.Overall, Section 6.10 serves as a closure layer for the framework, confirming dimensional rigor, algebraic consistency, and parameter interoperability without extending the theoretical postulates beyond the established MCR structure.
Myomin Aung (Thu,) studied this question.