Quaternionic complex manifolds and fixed-point sets of S1-actions
Abstract
In this paper, we study fixed-point sets of S1-actions and compatible complex structures on quaternionic manifolds. We obtain an equation involving the first Chern classes of the fixed-point set and of a quaternionically flat manifold with compatible complex structure of closed type. In addition, if the first Chern class of the fixed-point set is not trivial, then the quaternionic manifold does not admit hypercomplex structures containing given compatible complex structure on any open set containing the fixed-point set. Moreover, we determine the connected components of the fixed-point set arising from quaternionic S1-actions on the quaternionic projective space. We apply these results to Pontecorvo's example SO(2n+2)/SO(2n) × SO(2).
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