Real hypersurfaces of complex quadric in terms of star-Ricci tensor
Abstract
In this article, we introduce the notion of star-Ricci tensors in the real hypersurfaces of complex quadric Qm. It is proved that there exist no Hopf hypersurfaces in Qm,m≥3, with commuting star-Ricci tensor or parallel star-Ricci tensor. As a generalization of star-Einstein metric, star-Ricci solitons on M are considered. In this case we show that M is an open part of a tube around a totally geodesic CPm2⊂ Qm,m≥4.
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