DOIAbstract
AbstractThis note provides a complete answer to a problem of Ding–Fan–Li on the homotopy classes of harmonic Hopf constructions. Moreover, it gives applications to isoparametric gradient maps
AbstractThis note provides a complete answer to a problem of Ding–Fan–Li on the homotopy classes of harmonic Hopf constructions. Moreover, it gives applications to isoparametric gradient maps
It is known that there is no nonconstant bounded harmonic map from the Euclidean space Rn to the hyp...
Very recently, Markovic, Lemm-Markovic and Benoist-Hulin, established the existence of a harmonic ma...
Given a Hopf fibration of a round sphere by parallel great subspheres, we prove that the projection ...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
A map between compact Riemannian manifolds is called harmonic if it is a critical point of the Diric...
We establish existence and regularity for a solution of the evolution problem associated to p-harmon...
Let M and N be simply connected space forms, and U an open and connected subset of M. Further let n:...
This article presents L^p estimates for the gradient of p-harmonic maps. Since the system satisfies...
Abstract. Let V be an orthogonal representation of a compact Lie group G and let S(V), D(V) be the u...
Abstract. We study a class of maps, called Pseudo Horizontally Weakly Confor-mal (PHWC), which inclu...
In this note we give a complete classification of those holomorphic maps phgr:UrarrCopf n defined on...
This article is concerned with L^{p(x)} estimates of the gradient of p(x)-harmonic maps. It is know...
We extend the p-harmonic approximation lemma proved by Duzaar and Mingione for p-harmonic functions...
A harmonic morphism is a map between two Riemannian manifolds with the property that its composition...
It is known that there is no nonconstant bounded harmonic map from the Euclidean space Rn to the hyp...
Very recently, Markovic, Lemm-Markovic and Benoist-Hulin, established the existence of a harmonic ma...
Given a Hopf fibration of a round sphere by parallel great subspheres, we prove that the projection ...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
In this note, we will outline the classical results of Eells-Sampson [7] on the harmonic heat flow, ...
A map between compact Riemannian manifolds is called harmonic if it is a critical point of the Diric...
We establish existence and regularity for a solution of the evolution problem associated to p-harmon...
Let M and N be simply connected space forms, and U an open and connected subset of M. Further let n:...
This article presents L^p estimates for the gradient of p-harmonic maps. Since the system satisfies...
Abstract. Let V be an orthogonal representation of a compact Lie group G and let S(V), D(V) be the u...
Abstract. We study a class of maps, called Pseudo Horizontally Weakly Confor-mal (PHWC), which inclu...
In this note we give a complete classification of those holomorphic maps phgr:UrarrCopf n defined on...
This article is concerned with L^{p(x)} estimates of the gradient of p(x)-harmonic maps. It is know...
We extend the p-harmonic approximation lemma proved by Duzaar and Mingione for p-harmonic functions...
A harmonic morphism is a map between two Riemannian manifolds with the property that its composition...
It is known that there is no nonconstant bounded harmonic map from the Euclidean space Rn to the hyp...
Very recently, Markovic, Lemm-Markovic and Benoist-Hulin, established the existence of a harmonic ma...
Given a Hopf fibration of a round sphere by parallel great subspheres, we prove that the projection ...
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