• Author: Pohl, M.U.E.
• DOI: https://doi.org/10.5281/zenodo.18847562
• Published: 2026-03-03
• Cite as: Pohl, M. U. E. (2026). Timeless Maxwell Equations as Geometric Volume Balances in the Panvitalistic Theory (PVT). Zenodo. https://doi.org/10.5281/zenodo.18847563
• Abstract: Classical Maxwell's equations rely on three fundamental constants ($c$, $\varepsilon_0$, $\mu_0$) and an external time parameter. In the Panvitalistic Theory (PVT) volume is ontologically primary, time is internal angular curvature ($\pi = T/L$), and velocity is areal velocity $c_{\rm PVT} = L^2/T$. This paper presents a completely time-less reformulation of Maxwell's equations as geometric balances of 6D volume flows and angular changes. The classical equations with $c$, $\mu_0$ and $\varepsilon_0$ emerge exactly as the local 3D projection at perfect orthogonality ($\theta_{ij}=90^\circ$). All constants are shown to be calibration artefacts of the historical dual time definition (Polar-time versus Equator-time). A direct geometric proof is given that $G c_{\rm std} = 2/10^2$. Rest mass ($m = L^4/T^3$) arises as longitudinal projection from angular deviation. Quantum entanglement of electromagnetic waves appears naturally as shared angles between two 6D volumes.