TITLE:
The Foundations of Chronoscalar Field Theory I: Ordering Asymmetry, Admissibility, and the Emergence of Quantum Structure
AUTHORS:
Calvin Alexander Grant
KEYWORDS:
Time as Asymmetric Scalar Field, Admissibility Constraints, Relaxation Dynamics, NMR, Ordering Geometry, Anisotropic Transport
JOURNAL NAME:
Journal of Applied Mathematics and Physics,
Vol.14 No.2,
February
27,
2026
ABSTRACT: Chronoscalar Field Theory (CFT) replaces time as an external parameter with a physical, asymmetric scalar ordering field. In this framework, the classical and quantum phenomena we observe emerge as a result of the geometry of this scalar field and its admissibility constraints. There is no need for dark energy, cosmological constants, or any other assumed external forces. Instead, what we perceive as the acceleration of the universe, the quantum wavefunction, and the electromagnetic field are all emergent consequences of a primordial asymmetry in the chronoscalar field [1]. In CFT, inertia is not treated as a force but rather as a fundamental consequence of the deterministic geometry of the chronoscalar field. The field’s Machian admissibility framing gives rise to inertia through the global distribution of matter and energy, making what we observe as inertia an emergent phenomenon, not an external force [2]. The Schrödinger equation, Maxwell’s equations, and other field-theoretic structures are not fundamental laws but are coarse-grained representations of the underlying manifold geometry [3]. These physical laws emerge when the manifold reaches low entropy, at which point the ordering geometry stabilizes into familiar phenomena. In CFT, the Planck scale does not serve as a fundamental cutoff but instead as the minimum admissible support for stabilization. This paper presents the foundational equations of CFT, shows how emergent phenomena are derived from the chronoscalar field’s underlying geometry, and illustrates how they produce known physical results without the need for dark energy or new postulates.