Based on the ultimate axiomatic structure of the Pythagorean Frustum Unified System (PFUSRC), with the 45° coaxial bicone frustum as the primitive geometry, this paper proves the unified isomorphism between PFUSRC and three core frameworks of modern mathematics: the Yau Conjecture, Banach-Hilbert spaces, and Calabi-Yau manifolds. It is rigorously demonstrated that the PFUSRC geometry exhibits a rigid, global, and contradiction-free structural isomorphism with these three systems in terms of topological equilibrium, stability criteria, higher-dimensional compactification, complete normed structure, inner product orthogonality, and Ricci-flat conditions. On this basis, this paper further establishes a four-dimensional dimensional fusion threshold formula and stable dimensional interval criterion, clarifying the unique evolutionary path of dimensions 1 ⇒ 5 ⇒ 11. It also provides a unified ontological explanation for cosmic completeness and incompleteness, incorporating local unstable structures such as “local topological defects” (formerly “space lumps”) into the natural boundary conditions of the system. The entire text introduces no external assumptions, free parameters, or logical breaks, achieving the complete closure and unification of PFUSRC with top-tier modern mathematics.
Zhenmin Wang (Thu,) studied this question.
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