- Author:
Pohl, M.U.E.
- DOI:
https://doi.org/10.5281/zenodo.18841981
- Published:
2026-03-03
- Cite as:
Pohl, M. U. E. (2026). Deriving the Canonical Wheeler-DeWitt Equation from the Axioms of the Panvitalistic Theory (PVT): A Discussion of the ADM Formalism in PVT. Zenodo. https://doi.org/10.5281/zenodo.18841982
- Abstract:
The classical Lagrangian formalism $S = \int L \, dt$ is a cornerstone of standard physics but relies on an external time parameter and a continuum. The Panvitalistic Theory (PVT) eliminates both. This paper shows that the Lagrangian is an artefact of the historical dual time definition and replaces it with a volume-constraint operator derived directly from the axiom $\delta V = 0$. Dynamics emerge tautologically from rational 6D volume invariance and angular curvature ($\pi = T/L$). We introduce the clean notation $m$, $m_0$, $c_{\rm PVT}$, $E = L^6/T^5$ and demonstrate consistency with the Wheeler-DeWitt equation. PVT thereby provides a unified, rational, time-less dynamics without ad-hoc quantization.