Proving the Absence of the Perturbative Corrections to the N=2 U(1) Kähler Potential Using the N=1 Supergraph Techniques

Details Proving the Absence of the Perturbative Corrections to the N=2 U(1) Kähler Potential Using the N=1 Supergraph Techniques Proving the Absence of the Perturbative Corrections to the N=2 U(1) Kähler Potential Using the N=1 Supergraph Techniques

2011-11-16

arxiv.org/abs/1111.3723v2

Physics

High Energy Physics

High Energy Physics - Theory

22 pages, 19 figures

Scientific paper

Perturbative N=2 non-renormalization theorem states that there is no
perturbative correction to the Kahler potential \int d^4\theta
K(\Phi,\bar{\Phi}). We prove this statement by using the N=1 supergraph
techniques. We consider the N=2 supersymmetric U(1) gauge theory which
possesses general prepotential F(\Psi).

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