Spinorial representation of submanifolds in SLn(C)/SU(n)

Abstract

We give a spinorial representation of a submanifold of any dimension and co-dimension in a symmetric space G/H, where G is a complex semi-simple Lie group and H is a compact real form of G. This in particular includes SLn(C)/SU(n), and extends the previously known spinorial representation of a surface in H3 if n=2. We also recover the Bryant representation of a surface with constant mean curvature 1 in H3 and its generalization for a surface with holomorphic right Gauss map in SLn(C)/SU(n). As a new application, we obtain a fundamental theorem for the submanifold theory in that spaces.