Regularity for harmonic maps into certain Pseudo-Riemannian manifolds

Abstract

In this article, we investigate the regularity for certain elliptic systems without a L2-antisymmetric structure. As applications, we prove some ε-regularity theorems for weakly harmonic maps from the unit ball B= B(m) ⊂ Rm (m≥2) into certain pseudo-Riemannian manifolds: standard stationary Lorentzian manifolds, pseudospheres Sn ⊂ Rn+1 (1≤ ≤ n) and pseudohyperbolic spaces Hn ⊂ Rn+1+1 (0≤ ≤ n-1). Consequently, such maps are shown to be H\"older continuous (and as smooth as the regularity of the targets permits) in dimension m=2. In particular, we prove that any weakly harmonic map from a disc into the De-Sitter space Sn1 or the Anti-de-Sitter space Hn1 is smooth. Also, we give an alternative proof of the H\"older continuity of any weakly harmonic map from a disc into the Hyperbolic space Hn without using the fact that the target is nonpositively curved. Moreover, we extend the notion of generalized (weakly) harmonic maps from a disc into the standard sphere Sn to the case that the target is Sn (1≤ ≤ n) or Hn (0≤ ≤ n-1), and obtain some ε-regularity results for such generalized (weakly) harmonic maps.