Minimal Lagrangian surfaces in the tangent bundle of a Riemannian surface

Abstract

Given an oriented Riemannian surface (, g), its tangent bundle T enjoys a natural pseudo-K\"ahler structure, that is the combination of a complex structure , a pseudo-metric with neutral signature and a symplectic structure . We give a local classification of those surfaces of T which are both Lagrangian with respect to and minimal with respect to . We first show that if g is non-flat, the only such surfaces are affine normal bundles over geodesics. In the flat case there is, in contrast, a large set of Lagrangian minimal surfaces, which is described explicitly. As an application, we show that motions of surfaces in 3 or 31 induce Hamiltonian motions of their normal congruences, which are Lagrangian surfaces in T2 or T 2 respectively. We relate the area of the congruence to a second-order functional F=∫ H2-K dA on the original surface.