Timelike duality, M'-theory and an exotic form of the Englert solution

Abstract

Through timelike dualities, one can generate exotic versions of M-theory with different spacetime signatures. These are the M*-theory with signature (9,2,-), the M'-theory, with signature (6,5,+) and the theories with reversed signatures (1,10, -), (2,9, +) and (5,6, -). In (s,t, ), s is the number of space directions, t the number of time directions, and refers to the sign of the kinetic term of the 3 form. The only irreducible pseudo-riemannian manifolds admitting absolute parallelism are, besides Lie groups, the seven-sphere S7 SO(8)/SO(7) and its pseudo-riemannian version S3,4 SO(4,4)/SO(3,4). [There is also the complexification SO(8,C)/SO(7, C), but it is of dimension too high for our considerations.] The seven-sphere S7 S7,0 has been found to play an important role in 11-dimensional supergravity, both through the Freund-Rubin solution and the Englert solution that uses its remarkable parallelizability to turn on non trivial internal fluxes. The spacetime manifold is in both cases AdS4 × S7. We show that S3,4 enjoys a similar role in M'-theory and construct the exotic form AdS4 × S3,4 of the Englert solution, with non zero internal fluxes turned on. There is no analogous solution in M*-theory.