Add to ORKGWe provide a simpler proof and slight strengthening of Morrey's famous lemma on $ \varepsilon $-conformal mappings. Our result more generally applies to Sobolev maps with values in a complete metric space, and we obtain applications to the existence of area minimizing surfaces of higher genus in metric spaces. Unlike Morrey's proof, which relies on the measurable Riemann mapping theorem, we only need the existence of smooth isothermal coordinates established by Korn and Lichtenstein
Abstract. Any compact Riemann surface has a conformal model in any orientable Riemannian manifold. P...
Given a smooth, compact manifold, an important question to ask is, what are the ``best\u27\u27 metri...
Abstract. In this paper, we investigate the concept of (dimension) free quasi-conformality in metric...
We solve the classical problem of Plateau in the setting of proper metric spaces. Precisely, we pro...
We establish the definition of associate and conjugate conformal minimal isometric immersions into t...
Abstract. — We prove various inequalities measuring how far from an isometry a local map from a mani...
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
We prove a duality relation for the moduli of the family of curves connecting two sets and the famil...
We use the Green function of the Yamabe operator (conformal Laplacian) to construct a canonical metr...
We find maximal representatives within equivalence classes of metric spheres. For Ahlfors regular sp...
The classical Uniformization Theorem states that every simply connected Riemann surface is conformal...
Given a smooth, compact manifold, an important question to ask is, what are the best\u27\u27 metric...
International audienceWe establish the definition of associate and conjugate conformal minimal isome...
Abstract. In this note we prove that isometries in a conformally invariant metric of a general domai...
Abstract. We study harmonic maps between two distinct compact Riemann surfaces of the same genus. Ou...
Abstract. Any compact Riemann surface has a conformal model in any orientable Riemannian manifold. P...
Given a smooth, compact manifold, an important question to ask is, what are the ``best\u27\u27 metri...
Abstract. In this paper, we investigate the concept of (dimension) free quasi-conformality in metric...
We solve the classical problem of Plateau in the setting of proper metric spaces. Precisely, we pro...
We establish the definition of associate and conjugate conformal minimal isometric immersions into t...
Abstract. — We prove various inequalities measuring how far from an isometry a local map from a mani...
The theory of quasiconformal mappings generalizes to higher dimensions the geometric viewpoint in co...
We prove a duality relation for the moduli of the family of curves connecting two sets and the famil...
We use the Green function of the Yamabe operator (conformal Laplacian) to construct a canonical metr...
We find maximal representatives within equivalence classes of metric spheres. For Ahlfors regular sp...
The classical Uniformization Theorem states that every simply connected Riemann surface is conformal...
Given a smooth, compact manifold, an important question to ask is, what are the best\u27\u27 metric...
International audienceWe establish the definition of associate and conjugate conformal minimal isome...
Abstract. In this note we prove that isometries in a conformally invariant metric of a general domai...
Abstract. We study harmonic maps between two distinct compact Riemann surfaces of the same genus. Ou...
Abstract. Any compact Riemann surface has a conformal model in any orientable Riemannian manifold. P...
Given a smooth, compact manifold, an important question to ask is, what are the ``best\u27\u27 metri...
Abstract. In this paper, we investigate the concept of (dimension) free quasi-conformality in metric...