This work establishes the foundational mathematical layer of the Geometric–Structural Layer Closure program. It defines a well-founded base space, fibered structural organization, and projection-preserving transformations. All objects are constructed explicitly within a set-theoretic framework, ensuring termination, non-circularity, and structural consistency. The system is defined as a fibered hierarchy: • Base space (O, ≤) as a well-founded partially ordered set • Fiber assignment Fα over each base element • Total space E with projection π : E → O Transformation rules enforce invariance: π ∘ T = π Spectral constructions are introduced to extract invariant structures, ensuring stability under admissible transformations. This layer provides a complete, internally consistent structural foundation upon which all subsequent geometric operators and extensions are defined.
Ivan Petrov Pasev (Mon,) studied this question.
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