N=2 Born-Infeld Attractors
arXiv:1411.4954 · doi:10.1007/JHEP12(2014)065
Abstract
We derive new types of $U(1)^n$ Born-Infeld actions based on N=2 special geometry in four dimensions. As in the single vector multiplet (n=1) case, the non--linear actions originate, in a particular limit, from quadratic expressions in the Maxwell fields. The dynamics is encoded in a set of coefficients $d_{ABC}$ related to the third derivative of the holomorphic prepotential and in an SU(2) triplet of N=2 Fayet-Iliopoulos charges, which must be suitably chosen to preserve a residual N=1 supersymmetry.
16 pages, LaTeX. Misprints corrected, comment added. Final version to appear in JHEP