New remarks on DFR noncommutative phase-space

Abstract

The so-called canonical noncommutativity is based on a constant noncommutative parameter (θ). However, this formalism breaks Lorentz invariance and one way to recover it is to define the NC parameter as a variable, an extra coordinate of the system. One approach that uses the variable θ was developed by Doplicher, Fredenhagen and Roberts (DFR) and hence, their phase-space is formed by (x,p,θ) with extra-dimensions. In this work we have demonstrated precisely that this phase-space is incomplete because the variable θ requires an associated momentum and the so-called DFR phase-space is in fact formed by (x, p, θ, π), where π is an useful object. One of the models used here to demonstrate this fact brought other interesting results. We have used this complete phase-space to explain some undefined results in the θ-variable literature. Finally, we have shown the importance of this DFR-momentum since with it we could fill the gap that exist in θ-variable results. In other words, we have computed the field commutation relations of a QFT in this DFR phase-space. The results obtained here match exactly with the postulated (not demonstrated) values that dwell in the DFR literature.