Minimal surfaces in the product of two dimensional real space forms endowed with a neutral metric

Abstract

We investigate minimal surfaces in products of two-spheres S2p× S2p, with the neutral metric given by (g,-g). Here S2p⊂ Rp,3-p , and g is the induced metric on the sphere. We compute all totally geodesic surfaces and we give a relation between minimal surfaces and the solutions of the Gordon equations. Finally, in some cases we give a topological classification of compact minimal surfaces.