Unification of Gravity, Gauge and Higgs Fields by Confined Quantum Fields-Mathematical Formulation-

TL;DR

This paper presents a classical model unifying gravity, gauge, and Higgs fields through the embedding of a four-dimensional submanifold in higher-dimensional space, revealing how these fields emerge from geometric embedding functions.

Contribution

It introduces a geometric framework where gravity, gauge, and Higgs fields are derived from the embedding of a 4D manifold in higher-dimensional space, providing a unified classical description.

Findings

Fields with spin 1/2 are described by an infinite set of interacting fields.

Gravity, gauge, and Higgs fields are induced by embedding functions.

The model offers a geometric interpretation of fundamental interactions.

Abstract

Dynamics of quantized free fields ( of spin 0 and 1/2 ) contained in a subspace $V_*$ of an N+4 dimensional flat space $V$ is studied. The space $V_*$ is considered as a neighborhood of a four dimensional submanifold $M$ arbitrarily embedded into $V$. We study the system as a simple model of unified theory of gravity ($g$), SO(N) gauge fields ($A$) and Higgs fields ($\phi $). In this paper classical treatment of the system is given. We show that, especially when the fields have spin 1/2, the system is described by an infinite number of fields in $M$ interacting with $g$, $A$ and $\phi $. The fields $g$, $A$ and $\phi $ are induced themselves by embedding functions of $M$ and correspond respectively to induced metric, normal connection and extrinsic curvature of $M$.