Quantum Physics


Quaternionic Field Theory

Authors: J.A.J. van Leunen

The correct specification of the concept of physical fields requires a platform in which these physical fields can be defined. This platform represents a base model that emerges from a Hilbert lattice, a vector space, and a number system. The number system must be an associative division ring. Dynamic fields require the selection of the quaternionic number system. Quaternionic fields are constructed eigenspaces of normal operators in a quaternionic Hilbert space. The base model supports symmetry-related fields and a field that always and everywhere exists. It acts as a repository for dynamic geometric data.

Comments: 44 Pages. This is part of the Hilbert Book Model Project

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Submission history

[v1] 2019-11-06 08:16:39
[v2] 2019-11-12 14:12:22
[v3] 2019-11-14 07:51:24

Unique-IP document downloads: 14 times

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