Hypersurfaces of Spin$^c$ manifolds and Lawson type correspondence

Details Hypersurfaces of Spin$^c$ manifolds and Lawson type correspondence Hypersurfaces of Spin$^c$ manifolds and Lawson type correspondence

2012-03-14

arxiv.org/abs/1203.3034v2

Mathematics

Differential Geometry

to appear in Annals of Global Analysis and Geometry (AGAG)

Scientific paper

Simply connected 3-dimensional homogeneous manifolds $E(\kappa, \tau)$, with 4-dimensional isometry group, have a canonical Spin$^c$ structure carrying parallel or Killing spinors. The restriction to any hypersurface of these parallel or Killing spinors allows to characterize isometric immersions of surfaces into $E(\kappa, \tau)$. As application, we get an elementary proof of a Lawson type correspondence for constant mean curvature surfaces in $E(\kappa, \tau)$. Real hypersurfaces of the complex projective space and the complex hyperbolic space are also characterized via Spin$^c$ spinors.

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