The Elementary Particle Cube

TL;DR

This paper introduces the elementary particle cube, a discrete cubic lattice model with symmetry-based subgraphs representing elementary particles, explaining their properties and mass relationships in a novel geometric framework.

Contribution

It proposes a new geometric model using a cubic lattice and symmetry groups to represent elementary particles and their masses, offering a natural emergence of particle families.

Findings

Particle masses correlate with subgraph edge lengths.

The model explains three generations of leptons and quarks.

Symmetry group associates with fundamental particles.

Abstract

Postulating that spacetime is discrete, we assume that physical space is described by a 3-dimensional cubic lattice.The corresponding symmetry group of rotations has order 24 and motivates the introduction of a cubic shaped graph with 27 vertices and 351 edges. We call this graph the elementary particle cube (EPC) and consider the vertices as tiny cells that pre-elementary particles called preons can occupy and the edges as interactions between preons. The 23 nontrivial members of the symmetry group naturally associate with the 23 basic elementary particles. We assume that each elementary particle is described by a unique subgraph of the EPC. The particular subgraph is determined by symmetry and the particle's mass. We postulate that the particle mass is a certain function of the lengths of the edges in the graph representing the particle. This correspondence between particle graphs and mass appears to be quite accurate and gives a reason why leptons and quarks come in three generations. In this way, the basic elementary particles emerge in a natural way from a few simple principles. The paper ends with a discussion of hadrons, which as in the standard model, are composite systems of quarks.