Add to ORKGThe regularity of harmonic maps into spheres and applications to Bernstein problems b
In this paper we prove partial regularity for a weakly stable p-harmonic map from Omega into S-k whe...
We show a Bernstein theorem for minimal graphs of arbitrary dimension and codimension under a bound ...
In this paper we first introduce a transform for convex functions and use it to prove a Bernstein th...
AbstractWe prove Hölder continuity for n/2-harmonic maps from arbitrary subsets of Rn into a sphere....
We prove Hölder continuity for n/2-harmonic maps from subsets of Rn into a sphere. This extends a re...
Abstract. We prove (see Theorem 1.3 below) that a generalized harmonic map into a round sphere, i.e....
We introduce $n$/$p$-harmonic maps as critical points of the energy \[ \mathcal{E}_{n,p}(v) = \intl...
International audienceThis article addresses the regularity issue for stationary or minimizing fract...
We introduce n/pα-harmonic maps as critical points of the energy En;pα (v)= Rn δ α /2 v pα where poi...
This article addresses the regularity issue for stationary or minimizing fractional harmonic maps in...
Abstract. Via gauge theory, we give a new proof of partial regularity for harmonic maps in dimension...
We shall consider harmonic maps from $n$-dimensional compact connected Riemannian manifold with bou...
International audienceWe introduce new methods of complex analysis (inequalities of Bernstein type) ...
We prove an j-regularity theorem for vector-valued p-harmonic maps, which are critical with respect ...
The interior and boundary regularity of weakly intrinsic biharmonic maps from 4-manifolds to spheres...
In this paper we prove partial regularity for a weakly stable p-harmonic map from Omega into S-k whe...
We show a Bernstein theorem for minimal graphs of arbitrary dimension and codimension under a bound ...
In this paper we first introduce a transform for convex functions and use it to prove a Bernstein th...
AbstractWe prove Hölder continuity for n/2-harmonic maps from arbitrary subsets of Rn into a sphere....
We prove Hölder continuity for n/2-harmonic maps from subsets of Rn into a sphere. This extends a re...
Abstract. We prove (see Theorem 1.3 below) that a generalized harmonic map into a round sphere, i.e....
We introduce $n$/$p$-harmonic maps as critical points of the energy \[ \mathcal{E}_{n,p}(v) = \intl...
International audienceThis article addresses the regularity issue for stationary or minimizing fract...
We introduce n/pα-harmonic maps as critical points of the energy En;pα (v)= Rn δ α /2 v pα where poi...
This article addresses the regularity issue for stationary or minimizing fractional harmonic maps in...
Abstract. Via gauge theory, we give a new proof of partial regularity for harmonic maps in dimension...
We shall consider harmonic maps from $n$-dimensional compact connected Riemannian manifold with bou...
International audienceWe introduce new methods of complex analysis (inequalities of Bernstein type) ...
We prove an j-regularity theorem for vector-valued p-harmonic maps, which are critical with respect ...
The interior and boundary regularity of weakly intrinsic biharmonic maps from 4-manifolds to spheres...
In this paper we prove partial regularity for a weakly stable p-harmonic map from Omega into S-k whe...
We show a Bernstein theorem for minimal graphs of arbitrary dimension and codimension under a bound ...
In this paper we first introduce a transform for convex functions and use it to prove a Bernstein th...