Lagrangian immersions in the product of Lorentzian two manifold

Abstract

For Lorentzian 2-manifolds (1,g1) and (2,g2) we consider the two product para-K\"ahler structures (Gε,J,ε) defined on the product four manifold 1×2, with ε= 1. We show that the metric Gε is locally conformally flat (resp. Einstein) if and only if the Gauss curvatures 1,2 of g1,g2, respectively, are both constants satisfying 1=-ε2 (resp. 1=ε2). We give the conditions on the Gauss curvatures for which every Lagrangian surface with parallel mean curvature vector is the product γ1×γ2⊂1×2, where γ1 and γ2 are curves of constant curvature. We study Lagrangian surfaces in the product d S2× d S2 with non null parallel mean curvature vector and finally, we explore the stability and Hamiltonian stability of certain minimal Lagrangian surfaces and H-minimal surfaces.