Surfaces with parallel mean curvature in CPn×R and CHn×R

Abstract

We consider surfaces with parallel mean curvature vector (pmc surfaces) in CPn×R and CHn×R, and, more generally, in cosymplectic space forms. We introduce a holomorphic quadratic differential on such surfaces. This is then used in order to show that the anti-invariant pmc 2-spheres of a 5-dimensional non-flat cosymplectic space form of product type are actually the embedded rotational spheres SH2⊂ M2×R of Hsiang and Pedrosa, where M2 is a complete simply-connected surface with constant curvature. When the ambient space is a cosymplectic space form of product type and its dimension is greater than 5, we prove that an immersed non-minimal non-pseudo-umbilical anti-invariant 2-sphere lies in a product space M4×R, where M4 is a space form. We also provide a reduction of codimension theorem for the pmc surfaces of a non-flat cosymplectic space form.