Noncommutative Phase Spaces on Aristotle group
classification
🧮 math-ph
math.MP
keywords
phasespacesaristotlegroupmagneticnoncommutativecasescoadjoint
read the original abstract
We realize noncommutative phase spaces as coadjoint orbits of extensions of the Aristotle group in a two-dimensional space. Through these constructions the momenta of the phase spaces do not commute due to the presence of a naturally introduced magnetic field. These cases correspond to the minimal coupling of the momentum with a magnetic potential.
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