Framed null curves and timelike surfaces via Lorentzian harmonic maps into de-Sitter 2-space

Abstract

We construct a class of Lorentzian harmonic maps into the de-Sitter 2-space satisfying the eigenvalue equation N=2H2N for the d'Alambert operator and a non-zero constant H from framed null curves. We also investigate two classes of timelike surfaces associated with these Lorentzian harmonic maps: the first one is timelike surfaces with constant mean curvature H in Lorentz-Minkowski 3-space and the second one is timelike minimal surfaces in the three-dimensional Lorentzian Heisenberg group Nil3(H). In particular, we characterize some properties of singularities on timelike minimal surfaces in Nil3(H) via an invariant of framed null curves.