A short note on Casimir force and radius stabilization in QFT with   non-commutative target space

Michal Demetrian

arXiv:2011.05796·physics.gen-ph·November 12, 2020

A short note on Casimir force and radius stabilization in QFT with non-commutative target space

Michal Demetrian

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TL;DR

This paper investigates how non-commutative properties of a two-component field can lead to a stable radius in cylindrical space, highlighting a novel mechanism for radius stabilization in quantum field theory.

Contribution

It introduces a new approach showing non-commutativity induces repulsion that stabilizes the cylindrical space radius, a novel insight in quantum field theory with non-commutative target spaces.

Findings

01

Stable cylindrical space radius due to non-commutativity

02

Non-commutative fields induce repulsive effects

03

Potential implications for extra-dimensional models

Abstract

Stable radius of cylindrical space due to additional repulsion caused by noncommutativity of two-component field values is found.

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Taxonomy

TopicsQuantum Electrodynamics and Casimir Effect · Noncommutative and Quantum Gravity Theories · Quantum Mechanics and Applications