Timelike minimal Lagrangian surfaces in the indefinite complex hyperbolic two-space

Abstract

It has been known for some time that there exist 5 essentially different real forms of the complex affine Kac-Moody algebra of type A2(2) and that one can associate 4 of these real forms with certain classes of "integrable surfaces", such as minimal Lagrangian surfaces in CP2 and CH2, as well as definite and indefinite affine spheres in R3. In this paper we consider the class of timelike minimal Lagrangian surfaces in the indefinite complex hyperbolic two-space CH21. We show that this class of surfaces corresponds to the fifth real form. Moreover, for each timelike Lagrangian surface in CH21 we define natural Gauss maps into certain homogeneous spaces and prove a Ruh-Vilms type theorem, characterizing timelike minimal Lagrangian surfaces among all timelike Lagrangian surfaces in terms of the harmonicity of these Gauss maps.