Spinorial representation of submanifolds in a product of space forms

Abstract

We present a method giving a spinorial characterization of an immersion in a product of spaces of constant curvature. As a first application we obtain a proof using spinors of the fundamental theorem of immersion theory in that spaces. We also study special cases: we recover previously known results concerning immersions in S2×R and we obtain new spinorial characterizations of immersions in S2×R2 and in H2×R. We then study the theory of H=1/2 surfaces in H2×R using this spinorial approach, obtain new proofs of some of its fundamental results and give a direct relation with the theory of H=1/2 surfaces in R1,2.