Hypersurfaces of S2×S2 with constant sectional curvature

Abstract

In this paper, we classify the hypersurfaces of S2×S2 with constant sectional curvature. By applying the so-called Tsinghua principle, which was first discovered by the first three authors in 2013 at Tsinghua University, we prove that the constant sectional curvature can only be 12 and the product angle function C defined by Urbano is identically zero. We show that any such hypersurface is a parallel hypersurface of a minimal hypersurface in S2×S2 with C=0, and we establish a one-to-one correspondence between the involving minimal hypersurface and the famous ``sinh-Gordon equation'' (∂2∂ u2+∂2∂ v2)h =-12(2h). As a byproduct, we give a complete classification of the hypersurfaces of S2×S2 with constant mean curvature and constant product angle function C.