M{\o}ller scattering in $2 + 1$ of generalized quantum electrodynamics   in the heisenberg picture

David Montenegro

arXiv:2009.06727·quant-ph·September 16, 2020

M{\o}ller scattering in $2 + 1$ of generalized quantum electrodynamics in the heisenberg picture

David Montenegro

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TL;DR

This paper analyzes M{\

Contribution

It introduces a novel calculation of M{\

Findings

01

Differential cross section in 2+1 dimensions derived

02

Podolsky mass cutoff's influence evaluated

03

Results relevant for condensed matter systems

Abstract

In this paper, we investigate from the framework of generalized electrodynamics the differential cross section of the electron-electron scattering process $e^{-} e^{-} \to e^{-} e^{-}$ , i.e., M{\o}ller scattering, in $(2 + 1)$ dimensions in the Heisenberg picture. To this goal, one starts within the stable and unitary framework of planar generalized electrodynamics, instead of Maxwell one. We argue the Haag's theorem strongly suggests the study of the differential cross section in the Heisenberg representation. Afterward, we explore the influence of Podolsky mass cutoff and calculate the differential cross section considering data based on condensed matter systems.

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Taxonomy

TopicsQuantum and electron transport phenomena · Quantum Chromodynamics and Particle Interactions · Black Holes and Theoretical Physics