Supersymmetric Sum Rules for Electromagnetic Multipoles
Ioannis Giannakis, James T. Liu, Massimo Porrati
TL;DR
This paper derives universal supersymmetric sum rules relating electromagnetic multipole moments within N=1 supersymmetric theories, providing a non-perturbative framework for understanding these moments across different models.
Contribution
It introduces model-independent, non-perturbative sum rules for electromagnetic multipole moments in N=1 supersymmetry, linking diagonal and off-diagonal matrix elements.
Findings
Diagonal multipole moments are fixed by off-diagonal elements and lower multipole moments.
Sum rules apply universally to any N=1 supermultiplet.
Provides a non-perturbative understanding of electromagnetic properties in supersymmetric theories.
Abstract
We derive model independent, non-perturbative supersymmetric sum rules for the magnetic and electric multipole moments of any theory with N=1 supersymmetry. We find that in any irreducible N=1 supermultiplet the diagonal matrix elements of the l-multipole moments are completely fixed in terms of their off-diagonal matrix elements and the diagonal (l-1)-multipole moments.
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