This paper proposes a core proposition: the fundamental laws of the physical world are not laws about "force" or "geometry", but laws about "measurement". Starting from three core axioms—the essence of measurement is self-referential comparison, scales are generated by frequency differences, and the consistency condition of self-referential measurement is the meta-conservation law—this paper rigorously proves the physical necessity of core calculus concepts such as limits, derivatives, divergences, and integrals, derives the nonlinear field equation describing gravity, and naturally explains basic physical phenomena such as Fermat's principle, the Schwarzschild solution, and cosmological redshift. Furthermore, this paper proves the strict mathematical isomorphism between the normalized state space of TFT and the unit circle on the complex plane, providing a complete physical ontological interpretation for Euler's identity. The research shows that calculus is not a mathematical tool invented by humans, but the inherent language used by the universe to measure itself; Euler's identity is not an abstract mathematical miracle, but a complete declaration of the only possible mathematical structure of self-referential measurement. The conclusions of this paper provide a new, falsifiable theoretical framework for understanding the relationship between mathematics and physics, the ontological origin of symmetry and conservation, and the quantum-classical unification.
Huowang Huang (Wed,) studied this question.