A remark on one-harmonic maps from a Hadamard surface of pinched negative curvature to the hyperbolic plane

- On montre que les applications harmoniques minimisantes d’un domaine bidimensionnel vers la sphere sont nécessairement syme- triques des que leur trace est

CHEN, Weak solutions to the evolution problem for harmonic maps into spheres, preprint, Math. STRUWE, Existence and partial regularity results for the heat flow for

In the article under consideration, a variational procedure is invented that produces a map with holomorphic 03C6 in every homotopy class of maps between closed

We then prove for odd n the existence of equivariant harmonic maps from the hyperbolic space IHJn that are smooth at the ideal boundary of thus establishing the

In this article we prove a local existence theorem for harmonic maps from a globally hyperbolic manifold (M, g) into a riemannian manifold.. (N, h) both arbitrary

In the first section, we shall establish a method to estimate the energy of harmonic maps from a non-compact Kahler manifold provided with certain hyper convex exhaustion function

In the continuous limit h = 0 concentration-compactness arguments yield weak convergence results for such terms.. Our aim in the following will be to reduce the discrete

As it is well known, the regularity of a weakly harmonic map from an n-dimensional Riemannian manifold Mn into a N-dimensional Riemannian manifold MN depends on the