On minimal Lagrangian surfaces in the product of Riemannian two manifolds

Abstract

Let (1,g1) and (2,g2) be connected, complete and orientable Riemannian two manifolds. Consider the two canonical K\"ahler structures (Gε,J,ε) on the product 4-manifold 1×2 given by Gε=g1 ε g2, ε= 1 and J is the canonical product complex structure. Thus for ε=1 the K\"ahler metric G+ is Riemannian while for ε=-1, G- is of neutral signature. We show that the metric Gε is locally conformally flat iff the Gauss curvatures (g1) and (g2) are both constants satisfying (g1)=-ε(g2). We also give conditions on the Gauss curvatures for which every Gε-minimal Lagrangian surface is the product γ1×γ2⊂1×2, where γ1 and γ2 are geodesics of (1,g1) and (2,g2), respectively. Finally, we explore the Hamiltonian stability of projected rank one Hamiltonian Gε-minimal surfaces.