On the regularity of timelike extremal surfaces

Abstract

We study a class of timelike weakly extremal surfaces in flat Minkowski space R1+n, characterized by the fact that they admit a C1 parametrization (in general not an immersion) of a specific form. We prove that if the distinguished parametrization is of class Ck, then the surface is regularly immersed away from a closed singular set of euclidean Hausdorff dimension at most 1+1/k, and that this bound is sharp. We also show that, generically with respect to a natural topology, the singular set of a timelike weakly extremal cylinder in R1+n is 1-dimensional if n=2, and it is empty if n 4. For n=3, timelike weakly extremal surfaces exhibit an intermediate behavior.