Zeeman Effect In The Framework of Moyal Noncommutativity and String   Theory

A. El Boukili; E. H. Saidi; M. B. Sedra

arXiv:hep-th/0610123·hep-th·June 13, 2007

Zeeman Effect In The Framework of Moyal Noncommutativity and String Theory

A. El Boukili, E. H. Saidi, M. B. Sedra

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TL;DR

This paper explores the Zeeman effect within the framework of Moyal noncommutative geometry, connecting it to string theory, D-branes, and integrable systems, and relates findings to the Bigatti-Suskind formulation.

Contribution

It introduces a novel approach to understanding the Zeeman effect in noncommutative geometry and links it to string theory and existing formulations.

Findings

01

New insight into Zeeman effect in Moyal noncommutative space

02

Connection established between noncommutative geometry and string theory

03

Relation to Bigatti-Suskind formulation demonstrated

Abstract

Stimulated by the importance of noncommutative geometry in recent developments in string theory, D-branes and integrable systems, one intends in this work to present a new insight towards adapting the famous idea of Zeeman effect to noncommutativity \`a la Moyal and develop an analysis leading to connect our results to the Bigatti-Suskind (BS) formulation.

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Taxonomy

TopicsNoncommutative and Quantum Gravity Theories · Black Holes and Theoretical Physics · Algebraic structures and combinatorial models