摘要
Some Liouville type theorems for harmonic maps from Kahler manifolds are obtained. The main result is to prove that a harmonic map from a bounded symmetric domain (except <sub>IV</sub>(2)) to any Riemannian manifold with finite energy has to be constant.
Some Liouville type theorems for harmonic maps from Kahler manifolds are obtained. The main result is to prove that a harmonic map from a bounded symmetric domain (except <sub>IV</sub>(2)) to any Riemannian manifold with finite energy has to be constant.
基金
Research partially supported by NNSFC SFECC