Espace des twisteurs d'une vari\'et\'e quaternionique K\"ahler g\'en\'eralis\'ee

Abstract

To give an almost quaternionic structure on a 4n-manifold M is equivalent to give its bundle of twistors Z(Q) M. When Q is invariant under a torsion free connection, Z(Q) can be provided with an almost complex structure J . In the case n = 1 Atiyah, Hitchin and Singer have related the integrability of J to the geometry of (M, Q) . For n> 1 Salamon showed that the almost complex structure J on Z (Q) is always integrable. The purpose of this article is to extend these results to the generalized complex geometry. We begin by defining the concept of almost generalized quaternionic manifolds (M, g, Q ) . We will see that we can associate a twistor space denoted by Z( Q) which is a S2-bundle over M . When Q is invariant under a generalized torsion free connection, then Z( Q) comes with an almost generalized complex structure J. Whatever the dimension of M is, we give a criterion for integrability of the almost generalized complex structure J on Z( Q) . In the particular case where (M, g, Q) is a generalized quaternionic K\"ahler manifold, we show that J is always integrable as soon as n>1. We illustrate this work by giving several examples of generalized quaternionic K\"ahler manifolds for which the almost generalized complex structure J on the twistor space Z( Q) is integrable.