Principal fiber bundle description of number scaling for scalars and vectors: Application to gauge theory

TL;DR

This paper develops a fiber bundle framework for number scaling in physics and geometry, linking scalar and vector structures with gauge theory, and revealing connections to electromagnetic fields.

Contribution

It introduces a fiber bundle description of number scaling, integrating scalar and vector structures with connections and covariant derivatives, and relates these to gauge theory and electromagnetism.

Findings

Complex vector field associated with scaling is the gradient of a scalar field.

Imaginary part of the vector field acts like the electromagnetic field.

The framework connects number structures with physical gauge fields.

Abstract

The purpose of this paper is to put the description of number scaling and its effects on physics and geometry on a firmer foundation, and to make it more understandable. A main point is that two different concepts, number and number value are combined in the usual representations of number structures. This is valid as long as just one structure of each number type is being considered. It is not valid when different structures of each number type are being considered. Elements of base sets of number structures, considered by themselves, have no meaning. They acquire meaning or value as elements of a number structure. Fiber bundles over a space or space time manifold, M, are described. The fiber consists of a collection of many real or complex number structures and vector space structures. The structures are parameterized by a real or complex scaling factor, s. A vector space at a fiber level, s, has, as scalars, real or complex number structures at the same level. Connections are described that relate scalar and vector space structures at both neighbor M locations and at neighbor scaling levels. Scalar and vector structure valued fields are described and covariant derivatives of these fields are obtained. Two complex vector fields, each with one real and one imaginary field, appear, with one complex field associated with positions in $M$ and the other with position dependent scaling factors. A derivation of the covariant derivative for scalar and vector valued fields gives the same vector fields. The derivation shows that the complex vector field associated with scaling fiber levels is the gradient of a complex scalar field. Use of these results in gauge theory shows that the imaginary part of the vector field associated with M positions acts like the electromagnetic field. The physical relevance of the other three fields, if any, is not known.