Scaling with Planck-Wheeler Coordinates: Emergence from First Principles

Moving to coordinate systems involves something so fundamental to physicists, that the introduction to many physics courses is the spherical, Cartesian, Riemann, or cylindrical system. Even in medical curriculum, the concept of the body schematics or frames of reference are introduced at the beginning. Left, right, up, down, top, bottom, forward, backward, and direction are critical in understanding the furthering of Pythagorean interpretations of locality. Basically, the understanding of space and time are these local geometric shapes, which when tied to logic form things like Platonic solids. In higher dimensions, there are Platonic polytopes. The generation of some primordial physics is, however, connected to dimensionless parameters, or parameters that are invariant--somehow disconnected to the arbitrariness of human interpretation. Weyl is a paradigm shift in understanding the Euclidean system, with topological connection as the paragon of coordinates. In any case, using the fundamental constants of nature like electric charge, the speed of light, Planck's quantum constant, the Hubble constant, and fundamental particle masses might be a paradigm shift in the development of a new coordinate system. Patterns that have been deemed profound in culture are really artifacts of vanity. What we need is a move to absolutist local and non-local connected diagrams. The spacing of prime numbers leads to a Cantor dust like formation of nodes that are isomorphic to stellar helio-seismology. In essence, the field axioms and relations of number theory, connected to a dimensionless physical world set of laws, will result in the creation of a better physics that leads to pattern recognition without the human centric interpretation. This will lead to advances in thought, where better theories predict and manipulate everything in the natural world, from quantum electrodynamics and signal analysis-transmission to fusion and particle physics.