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Pré-Publication, Document De Travail Année : 2021

$\mathcal{N}=1$ supersymmetric three-dimensional QED in the large-$N_f$ limit and applications to super-graphene

Résumé

We study $\mathcal{N}=1$ supersymmetric three-dimensional Quantum Electrodynamics with $N_f$ two-component fermions. Due to the infra-red (IR) softening of the photon, $\ep$-scalar and photino propagators, the theory flows to an interacting fixed point deep in the IR, $p_E \ll e^2 N_f/8$, where $p_E$ is the euclidean momentum and $e$ the electric charge. At next-to-leading order in the $1/N_f$-expansion, we find that the flow of the dimensionless effective coupling constant $\overline{\al}$ is such that: $\overline{\al} \ra 8/\big(N_f \,(1+C/N_f)\big) \approx (8/N_f)(1-0.4317/N_f)$ where $C= 2\,(12-\pi^2)/\pi^2$. Hence, the non-trivial IR fixed point is stable with respect to quantum corrections. Various properties of the theory are explored and related via a mapping to the ones of a $\mathcal{N}=1$ model of super-graphene. In particular, we derive the interaction correction coefficient to the optical conductivity of super-graphene, $C_{\rm sg} = (12-\pi^2)/(2\pi) = 0.3391$, which is six times larger than in the non-supersymmetric case, $C_{\rm g} = (92-9\pi^2)/(18\pi) = 0.0561$.

Dates et versions

hal-03150554 , version 1 (23-02-2021)

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A. James, S. Metayer, S. Teber. $\mathcal{N}=1$ supersymmetric three-dimensional QED in the large-$N_f$ limit and applications to super-graphene. 2021. ⟨hal-03150554⟩
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