Pseudo-Euclidean Gravity

Abstract

A new theory of a (flat) spacetime gravitational interaction is presented. This theory follows almost effortlessly from a new Lagrangian formulation of Maxwell's theory for photons and electrons (and positrons) whose associated Euler Lagrange equations imply the conventional Maxwell equations, but which possesses new bosonic degrees of freedom that may be associated with a fundamental gravitational interaction. The precise character of this gravitational interaction with photons is explicitly defined in terms of a local U(1)-invariant Lagrangian in Eq.[Lagrangian3]. The new formulation of Maxwell's theory is cast on the real, eight dimensional pseudo-Euclidean vector space defined by the split octonion algebra, regarded as a vector space over R, and denoted R4,4 M3,1 *M3,1. (Here M3,1 denotes real four-dimensional Minkowski space-time and *M3,1 denotes its dual; R4,4 resembles the phase space of a single relativistic particle.) This gravitational interaction is carried by a field that defines an algebraically distinguished element of the split octonion algebra, namely, the multiplicative unit element. We call this interaction the "unit" interaction, since any equivalence with Newton-Einstein gravity has yet to be established.