Structural Properties of Irreducible Two-Particle Representations of the Poincar\'e Group

TL;DR

This paper explores how the geometric constraints of irreducible two-particle representations of the Poincaré group imply a correlation that may underlie electromagnetic interactions, with the correlation strength matching the fine structure constant.

Contribution

It proposes a geometric interpretation of particle correlation in two-particle Poincaré representations and links it to the electromagnetic fine structure constant.

Findings

Correlation strength matches the fine structure constant

Geometric constraints imply an electromagnetic-like interaction

Suggests a fundamental geometric origin of electromagnetic interaction

Abstract

Two particles, described by an irreducible two-particle representation of the Poincar\'e group, are correlated by the constraints that the constancy of the Casimir operators imposes on the state space. This correlation can be understood as a geometrically caused interaction between the particles, the strength of which is related to the normalisation constant $\omega$ of the two-particle states by $4\pi\,\omega^2$. The numerical value of $4\pi\,\omega^2$ is found to match the experimental value of the electromagnetic fine structure constant $\alpha$. This strongly suggests that the correlation of two particles in an irreducible two-particle representation of the Poincar\'e group manifests itself in the electromagnetic interaction.