Born-Infeld inspired bosonic action in a noncommutative geometry

Emmanuel Serie; Thierry Masson; Richard Kerner

arXiv:hep-th/0408012·hep-th·November 10, 2009

Born-Infeld inspired bosonic action in a noncommutative geometry

Emmanuel Serie, Thierry Masson, Richard Kerner

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TL;DR

This paper adapts the Born-Infeld Lagrangian to non-abelian gauge theories within non-commutative matrix geometry, exploring static and dynamic solutions in the scalar sector.

Contribution

It introduces a Born-Infeld inspired bosonic action tailored for non-commutative geometry, extending gauge theory formulations.

Findings

01

Analysis of static solutions

02

Investigation of time-dependent solutions

03

Insights into scalar sector dynamics

Abstract

The Born-Infeld lagrangian for non-abelian gauge theory is adapted to the case of the generalized gauge fields arising in non-commutative matrix geometry. Basic properties of static and time dependent solutions of the scalar sector of this model are investigated.

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