An Unbroken Axial Vector Current Conservation Law

TL;DR

This paper proposes that axial-vector current conservation remains unbroken in neutrinos, suggesting a new framework involving mirror Minkowski space and differences in neutrino properties based on their handedness.

Contribution

It introduces a novel theoretical model with flavor-symmetrical axial-vector matrices and a new CP-even Dirac equation, explaining mirror symmetry violation and unbroken axial-vector current conservation.

Findings

Neutrinos exhibit mass, energy, and momentum differences based on handedness.

A new Dirac equation accounts for axial-vector mass and energy matrices.

Mirror Minkowski space provides a framework for neutrino properties.

Abstract

The mass, energy and momentum of the neutrino of a true flavor have an axial-vector nature. As a consequence, the left-handed truly neutral neutrino in an axial-vector field of emission can be converted into a right-handed one and vice versa. This predicts the unidenticality of masses, energies and momenta of neutrinos of the different components. Recognizing such a difference in masses, energies, momenta and accepting that the left-handed axial-vector neutrino and the right-handed antineutrino of true neutrality refer to long-lived C-odd leptons, and the right-handed truly neutral neutrino and the left-handed axial-vector antineutrino are of short-lived fermions of C-oddity, we would write a new CP-even Dirac equation taking into account the flavor symmetrical axial-vector mass, energy and momentum matrices. Their presence explains the spontaneous mirror symmetry violation, confirming that an axial-vector current conservation law has never violated. They reflect the availability of a mirror Minkowski space in which a neutrino is characterized by left as well as by right space-time coordinates. Therefore, it is not surprising that whatever the main purposes experiments about a quasielastic axial-vector mass say in favor of an axial-vector mirror Minkowski space-time.