Relationship between Conformal Geometrodynamics and Dirac Equations

TL;DR

This paper explores a novel correspondence between conformal geometrodynamics and Dirac equations, suggesting potential insights into the physical meaning of the Weyl vector and its relation to bispinor current densities.

Contribution

It introduces a unique phenomenon linking Weyl degrees of freedom with Dirac bispinors, offering new perspectives on the Weyl vector's physical interpretation.

Findings

Established a one-to-one correspondence between Weyl phenomena and Dirac bispinors.

Proposed identifying the Weyl vector with bispinor current density.

Discussed implications for understanding the Weyl vector's physical meaning.

Abstract

The paper describes a unique phenomenon -- the possibility of establishing, in certain space regions, the one-to-one correspondence between equations related to absolutely different physical phenomena: (1) phenomena associated with the Weyl degrees of freedom in plane space; (2) phenomena, which can be described in terms of half-integer spin particles and observed quantities corresponding to a full set of bispinors. The phenomenon established opens wide prospects for resolving in future the ``old'' disputable issue concerning the physical meaning of the Weyl vector. The paper discusses, in particular, the possibility of identifying the Weyl vector with the current density vector of bispinors constituting a bispinor matrix included in the Dirac equation. Some other issues are also discussed.