Modern mathematics, despite its global triumphs across natural sciences, suffers from a congenital, systemic deficiency in ontology. The two prevailing operational foundations—ZFC axiomatic set theory and constructive type theory (e. g. , Lean 4, Rocq) —both operate as "rootless" deductive or computational instruments without providing an ontological commitment to the objective reality of mathematical objects. This lack of an ontological anchor is far from an idle speculative exercise; it has metastasized into severe structural blights impeding vanguard sciences, leading to the century-long argumentative gridlock over the Riemann Hypothesis, the lack of ontological correspondence in quantum gravity unification, and the interpretability black-box crisis in artificial intelligence. Leveraging the four core laws of Yuanxian Theory (YXT) —the Law of Cosmic Factor Conservation (FSC), the Law of True-Circle Self-Consistency (TCSC), the Law of Self-Referential Mind-Field Generation (SRM), and the Law of Spacetime Uniqueness (STM) —this paper delivers a systemic diagnosis of these global academic detriments and proposes a comprehensive reconstruction blueprint: the Topological Projection Paradigm. We establish the 64-dimensional compact toroidal manifold (T64) as the sole, ultimate objective ontology of the global mathematical architecture. Mathematics is strictly redefined not as a human subjective invention, but as a meta-level objective description of the intrinsic self-consistent structure of the cosmic Self-Referential Mind-Field (PsiSR) within abstract cognition. The paper rigorously proves that the Yuanxian mathematical framework operates as a conservative extension of classical ZFC by constructing a transitive inner model Vₖappa, meaning all existing mathematical fruits are preserved while their interpretive paradigm is elevated. Within this framework, primitive mathematical concepts (from natural numbers to complex domains) are reduced to low-dimensional topological sectional projections of T64. Finally, three sets of falsifiable empirical and computational predictions—including the topological consistency test of Riemann zeroes against the T64 Dirac operator spectrum—are provided to bridge this ontological reconstruction with concrete scientific validation, completing an historic paradigm ascension for the baseline logic of modern science. 现代数学尽管在自然科学中取得了全球性的胜利, 但在本体论层面却存在着与生俱来的系统性缺失。当前现代数学的两大运行根基——ZFC公理化集合论与构造类型论 (如 Lean 4、Rocq) ——均属于“无根”的演绎或计算工具, 从未给出数学对象客观实在性的本体论承诺。这种本体锚点的缺失绝非纯粹的哲学思辨, 它已然演变为掣肘前沿科学突破的严重结构性病害, 直接导致了数论领域对黎曼猜想长达百年的论证僵局、量子引力统一理论中数学结构与物理本体的对应缺失, 以及人工智能深度学习的可解释性黑箱危机。 本文依托元宪理论 (YXT) 四大核心规律——宇宙因子守恒律 (FSC) 、真圆自洽律 (TCSC) 、自指心场生成律 (SRM) 与时空唯一性律 (STM), 对这些全域学术遗害展开系统性诊断, 并提出了整体性的重构方案——“拓扑投影范式”。本文确立六十四维紧致环面拓扑流形 (T64) 为全域数学体系的唯一终极客观本体。数学被严格重新定义为宇宙自指心场 (PsiSR) 内在自洽拓扑结构在抽象认知维度的元级客观描述, 而非人类的主观发明。本文通过在ZFC体系内部显式构造传递内模型 Vₖappa, 严格证明了元宪数理框架属于经典ZFC体系的保守扩展, 在完整保留人类既有数学成果的同时实现了全盘解释范式的升维。在此框架下, 从自然数到复数域的所有基础数学概念, 均被规约为T64高维环面在不同能标下的低维拓扑截面投影。最后, 本文提出了三组具备完全可证伪性的实证与计算预言 (包括黎曼零点与T64标准狄拉克算子谱的统计一致性检验等), 为该本体论重构方案提供了清晰的科学检验路径, 完成了现代科学底层范式的历史性升维。
Zhenyuan Acharya (Fri,) studied this question.