Spin foams, causal links and geometry-induced interactions

TL;DR

This paper explores a spin foam model with SO(3,2) symmetry that unifies all four fundamental interactions within a geometric framework, bridging paradigms of translation invariance and spacetime geometry.

Contribution

It reformulates a geometric spin foam model to incorporate particle interactions, including realistic coupling constants, unifying fundamental forces within a quantum geometric approach.

Findings

Model defines a spacetime with interacting quantized fields.

Includes all four fundamental interactions with realistic coupling constants.

Reconciles paradigms of translation invariance and spacetime geometry.

Abstract

Current theories of particle physics, including the standard model, are dominated by the paradigm that nature is basically translation invariant. Deviations from translation invariance are described by the action of forces. General relativity is based on a different paradigm: There is no translation invariance in general. Interaction is a consequence of the geometry of spacetime, formed by the presence of matter, rather than of forces. In recent years the formation of spacetime on a quantum mechanical level, has been intensively studied within the framework of spin foams, following an old idea from R. Penrose. In this connection it would be appropriate to reconsider the meaning of those paradigms and attempt to apply the paradigm of general relativity to particle physics. A spin foam model with underlying SO(3,2) symmetry is well-suited for this purpose. It represents a purely geometric model in the sense of the second paradigm. By applying perturbative methods, starting from a translation invariant first approximation, this model is reformulated in the sense of the first paradigm. It will be shown that the model then defines a spacetime manifold equipped with a particle theory in the form of locally interacting quantized fields. This includes all four types of interaction: electromagnetic, weak, chromodynamics and gravitation together with realistic numerical values of the corresponding coupling constants.