Physics on the adiabatically changed Finslerian manifold and cosmology

TL;DR

This paper demonstrates that the Planck constant is an adiabatic invariant on a Finslerian manifold with changing geometry, leading to natural quantization of electromagnetic fields and implications for cosmology.

Contribution

It introduces a geometric quantization framework on Finslerian manifolds with adiabatic changes, linking fundamental constants to manifold properties and deriving cosmological effects.

Findings

Planck constant is an adiabatic invariant on the Finslerian manifold.

Variation of fundamental constants like the fine structure constant is calculated.

Electrodynamics equations on the Finslerian manifold naturally lead to quantization.

Abstract

In present paper we confirm our previous result [5] that the Planck constant is adiabatic invariant of electromagnetic field propagating on the adiabatically changed Finslerian manifold. Direct calculation from cosmological parameters gives value h=6x10(-27) (erg s). We also confirm that Planck constant (and hence other fundamental constants which depend on h) is varied on time due to changing of geometry. As an example the variation of the fine structure constant is calculated. Its relative variation ((da/dt)/a) consist 1.0x10(-18) (1/s). We show that on the Finsler manifold characterized by adiabatically changed geometry, classical free electromagnetic field is quantized geometrically, from the properties of the manifold in such manner that adiabatic invariant of field is ET=6x10(-27)=h(erg s). Equations of electrodynamics on the Finslerian manifold are suggested. It is stressed that quantization naturally appears from these equations and is provoked by adiabatically changed geometry of manifold. We consider in details two direct consequences of the equations: i) cosmological redshift of photons and ii) effects of Aharonov -- Bohm that immediately follow from obtained equations. It is shown that quantization of system consists of electromagnetic field and baryonic components (like atoms) is obvious and has clear explanation.