Manifestly N=3 supersymmetric Euler-Heisenberg action in light-cone superspace
Thomas Boettner, Sergei V. Ketov, Thomas Lau (ITP, University of, Hannover)
TL;DR
This paper constructs a manifestly N=3 supersymmetric version of the Euler-Heisenberg action in four dimensions using light-cone superspace, extending the understanding of supersymmetric gauge theories.
Contribution
It introduces a novel N=3 supersymmetric generalization of the Euler-Heisenberg action in light-cone superspace, which was not previously available.
Findings
Successfully derived the N=3 supersymmetric F^4 action
Provided a new superspace formulation for the Euler-Heisenberg action
Enhanced the theoretical framework for supersymmetric gauge theories
Abstract
We find a manifestly N=3 supersymmetric generalization of the four-dimensional Euler-Heisenberg (four-derivative, or F^4) part of the Born-Infeld action in light-cone gauge, by using N=3 light-cone superspace.
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