# Equations for fields with additional fundamental physical constants

**Authors:** V. V. Khruschov

arXiv: 1903.06390 · 2023-10-23

## TL;DR

This paper explores a generalized Lie algebra of operators incorporating additional fundamental physical constants, relevant for advanced theories like quantum gravity and noncommutative space-time, and derives related equations for generalized fields.

## Contribution

It introduces a new algebraic framework with additional constants and provides representations and equations for generalized fields within this structure.

## Key findings

- The algebra depends on constants c, h, H, L, M.
- In the limit of infinite H, L, M, it reduces to canonical quantum theory.
- Derived equations for generalized fields with additional fundamental constants.

## Abstract

The author investigates the general Lie algebra of operators of coordinates, momenta, and Lorentz group generators, which can be used in quantum gravity, theories with generalized uncertainty principle, double and triple relativity and theories with noncommutative space-time and momentum spaces. The structure constants of this algebra depend on the constants {\it c} and {\it h}, as well as additional constants with dimensions of action ({\it H}), length ({\it L}), and mass ({\it M}). In the limiting case of infinite {\it H}, {\it L}, and {\it M}, the algebra goes into that of operators of the canonical quantum theory in Minkowski space-time. Some representations of this algebra and equations for generalized fields depending on additional fundamental physical constants are given.

## Full text

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## References

38 references — full list in the complete paper: https://tomesphere.com/paper/1903.06390/full.md

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