Holomorphic hypersurfaces of Kaehler manifolds with Norden metric

Published 9 Nov 2012 in math.DG | (1211.2091v1)

Abstract: We study Kaehlerian manifolds with Norden metric $g$ and develop the theory of their holomorphic hypersurfaces with constant totally real sectional curvatures. We prove a classification theorem for the holomorphic hypersurfaces of $(\mathbb{R}^{2n+2}, g, J)$ with constant totally real sectional curvatures.

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