/ 05 06 01 0 v 3 2 6 A ug 2 00 5 Generalized spacetimes defined by cubic forms and the minimal unitary realizations of their quasiconformal groups
نویسنده
چکیده
We study the symmetries of generalized spacetimes and corresponding phase spaces defined by Jordan algebras of degree three. The generic Jordan family of formally real Jordan algebras of degree three describe extensions of the Minkowskian spacetimes by an extra “dilatonic” coordinate, whose rotation, Lorentz and conformal groups are SO(d−1), SO(d−1, 1)×SO(1, 1) and SO(d, 2)×SO(2, 1), respectively. The generalized spacetimes described by simple Jordan algebras of degree three correspond to extensions of Minkowskian spacetimes in the critical dimensions (d = 3, 4, 6, 10) by a dilatonic and extra (2, 4, 8, 16) commuting spinorial coordinates, respectively. Their rotation, Lorentz and conformal groups are those that occur in the first three rows of the Magic Square. The Freudenthal triple systems defined over these Jordan algebras describe conformally covariant phase spaces. Following hep-th/0008063, we give a unified geometric realization of the quasiconformal groups that act on their conformal phase spaces extended by an extra “cocycle” coordinate. For the generic Jordan family the quasiconformal groups are SO(d+2, 4), whose minimal unitary realizations are given. The minimal unitary representations of the quasiconformal groups F4(4), E6(2), E7(−5) and E8(−24) of the simple Jordan family were given in our earlier work hep-th/0409272. [email protected] [email protected]
منابع مشابه
/ 05 06 01 0 v 2 2 0 Ju n 20 05 Generalized spacetimes defined by cubic forms and the minimal unitary realizations of their quasiconformal groups Murat
We study the symmetries of generalized spacetimes and corresponding phase spaces defined by Jordan algebras of degree three. The generic Jordan family of formally real Jordan algebras of degree three describe extensions of the Minkowskian spacetimes by an extra “dilatonic” coordinate, whose rotation, Lorentz and conformal groups are SO(d−1), SO(d−1, 1)×SO(1, 1) and SO(d, 2)×SO(2, 1), respective...
متن کامل0 v 1 1 J un 2 00 5 Generalized spacetimes defined by cubic forms and the minimal unitary realizations of their quasiconformal groups
We study the symmetries of generalized spacetimes and corresponding phase spaces defined by Jordan algebras of degree three. The generic Jordan family of formally real Jordan algebras of degree three describe extensions of the Minkowskian spacetimes by an extra ”dilatonic” coordinate, whose rotation, Lorentz and conformal groups are SO(d−1), SO(d−1, 1)×SO(1, 1) and SO(d, 2)×SO(2, 1), respective...
متن کاملRealizations of Exceptional U-duality Groups as Conformal and Quasi-conformal Groups and Their Minimal Unitary Representations
We review the novel quasiconformal realizations of exceptional U-duality groups whose ”quantization” lead directly to their minimal unitary irreducible representations. The group E8(8) can be realized as a quasiconformal group in the 57 dimensional charge-entropy space of BPS black hole solutions of maximal N = 8 supergravity in four dimensions and leaves invariant ”lightlike separations” with ...
متن کاملSpectrum Generating Conformal and Quasiconformal U-Duality Groups, Supergravity and Spherical Vectors
After reviewing the algebraic structures that underlie the geometries of N = 2 Maxwell-Einstein supergravity theories (MESGT) in five and four dimensions with symmetric scalar manifolds, we give a unified realization of their three dimensional U-duality groups as spectrum generating quasiconformal groups. They are F4(4), E6(2), E7(−5), E8(−24) and SO(n + 2, 4). Our formulation is covariant with...
متن کاملar X iv : h ep - t h / 05 02 23 5 v 1 2 6 Fe b 20 05 Unitary Realizations of U - duality Groups as Conformal and Quasiconformal Groups and Extremal Black Holes
We review the current status of the construction of unitary representations of Uduality groups of supergravity theories in five, four and three dimensions. We focus mainly on the maximal N = 8 supergravity theories and on the N = 2 MaxwellEinstein supergravity (MESGT) theories defined by Jordan algebras of degree three in five dimensions and their descendants in four and three dimensions. Entro...
متن کامل