Noncommutative Geometry Framework and The Feynman's Proof of Maxwell Equations

TL;DR

This paper explores Feynman's proof of Maxwell's equations within a noncommutative geometry framework, revealing new corrections that suggest the theoretical possibility of magnetic monopoles due to non-zero divergence of magnetic fields.

Contribution

It introduces a noncommutative geometry approach to Feynman's proof, extending Maxwell equations and highlighting potential magnetic monopole sources.

Findings

Derived non-trivial $ heta$-extensions of Maxwell equations.

Found that noncommutativity allows for magnetic monopole-like sources.

Identified corrections to Maxwell equations in noncommutative space.

Abstract

The main focus of the present work is to study the Feynman's proof of the Maxwell equations using the NC geometry framework. To accomplish this task, we consider two kinds of noncommutativity formulations going along the same lines as Feynman's approach. This allows us to go beyond the standard case and discover non-trivial results. In fact, while the first formulation gives rise to the static Maxwell equations, the second formulation is based on the following assumption $m[x_{j},\dot{x_{k}}]=i\hbar \delta_{jk}+im\theta_{jk}f.$ The results extracted from the second formulation are more significant since they are associated to a non trivial $\theta $-extension of the Bianchi-set of Maxwell equations. We find $div_{\theta}B=\eta_{\theta}$ and $\frac{\partial B_{s}}{\partial t}+\epsilon_{kjs}\frac{\partial E_{j}}{\partial x_{k}}=A_{1}\frac{d^{2}f}{dt^{2}}+A_{2}\frac{df}{dt}+A_{3},$ where $\eta_{\theta}$, $A_{1}$, $A_{2}$ and $A_{3}$ are local functions depending on the NC $\theta $-parameter. The novelty of this proof in the NC space is revealed notably at the level of the corrections brought to the previous Maxwell equations. These corrections correspond essentially to the possibility of existence of magnetic charges sources that we can associate to the magnetic monopole since $div_{\theta}B=\eta_{\theta}$ is not vanishing in general.