Half-dimensional immersions into the para-complex projective space and Ruh-Vilms type theorems

Abstract

In this paper we study isometric immersions f:Mn C\!Pn of an n-dimensional pseudo-Riemannian manifold Mn into the n-dimensional para-complex projective space C\!Pn. We study the immersion f by means of a lift f of f into a quadric hypersurface in S2n+1n+1. We find the frame equations and compatibility conditions. We specialize these results to dimension n = 2 and a definite metric on M2 in isothermal coordinates and consider the special cases of Lagrangian surface immersions and minimal surface immersions. We characterize surface immersions with special properties in terms of primitive harmonicity of the Gauss maps.

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