Hypersymmetry of gravitational and inertial masses in relativistic field theories

Abstract

The paper discusses, first, distinctions between gravitational and inertial masses (considered as isotopic field-charge (IFC)siblings of the gravitational field), and the ways, how they modify physical theories, including GTR. It shows that their equivalence does not mean identity. Introduction of qualitatively different mass terms modifies (among others) the gravitational equation. That leads to apparently losing its symmetry. In order to keep the symmetry of the stress-energy tensor, then, the paper identifies a symmetry group by the help of the tau algebra, which is isomorphic with the SU(2) group. The tau algebra transforms 3+1 type quantities. Invariance under the transformations of this group is called hypersymmetry (HySy). The group of HySy can make a correspondence between vector components and scalars. Next, there is shown how does the HySy group restore the apparently distorted symmetry of the stress-energy tensor. Finally, HySy is applied to the gravitational theory, and there are discussed a few consequences for the gravitational equation in quantum gravity. They are based on the, earlier disclosed, conservation of a property of the IFC-s, called isotopic field-charge spin (IFCS). It is shown that the solutions of the equations should be doubled, and another mediating boson, called dion, is to be assumed in the gravitational interaction, (anti)parallel with the graviton.