Squaring the magic

Abstract

We construct and classify all possible Magic Squares (MS’s) related to Euclidean or Lorentzian rank-3 simple Jordan algebras, both on normed division algebras and split composition algebras. Besides the known Freudenthal-Rozenfeld-Tits MS, the single-split Gunaydin-Sierra-Townsend MS, and the double-split Barton-Sudbery MS, we obtain other 7 Euclidean and 10 Lorentzian novel MS’s. We elucidate the role and the meaning of the various non-compact real forms of Lie algebras, entering the MS’s as symmetries of theories of Einstein-Maxwell gravity coupled to non-linear sigma models of scalar fields, possibly endowed with local supersymmetry, in D = 3, 4 and 5 space-time dimensions. In particular, such symmetries can be recognized as the U -dualities or the stabilizers of scalar manifolds within space-time with standard Lorentzian signature or with other, more exotic signatures, also relevant to suitable compactifications of the so-called M∗and M ′theories. Symmetries pertaining to some attractor U -orbits of magic supergravities in Lorentzian space-time also arise in this framework. ar X iv :1 20 8. 61 53 v2 [ m at hph ] 2 5 Se p 20 12