On the structure Lie operator of a real hypersurface in the complex quadric

Abstract

The almost contact metric structure that we have on a real hypersurface M in the complex quadric Qm=SOm+2/SOmSO2 allows us to define, for any nonnull real number k, the k-th generalized Tanaka-Webster connection on M, ∇(k). Associated to this connection we have Cho and torsion operators, FX(k) and TX(k), respectively, for any vector field X tangent to M. From them and for any symmetric operator B on M we can consider two tensor fields of type (1,2) on M that we will denote by BF(k) and BT(k), respectively. We will classify real hypersurfaces M in Qm for which any of those tensors identically vanishes, in the particular case of B being the structure Lie operator L on M.