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Ali Fardoun 《manuscripta mathematica》2005,116(1):57-69
We consider weakly p-harmonic maps (p2) from a compact connected Riemannian manifold Mm(m2) to the the standard sphere Sn with values in the closed hemisphere Sn+ = {x Sn : xn+1 0 } (n 2). We first prove that if u=(u1,...,un+1):MSn is a weakly p-harmonic map satisfying un+1(x)>0 a.e. on M, then it is a minimizing p-harmonic map. Next, we give a necessary and sufficient condition for the boundary data : M Sn+ to achieve uniqueness; and when this condition fails, we are able to describe the set of all minimizers. When M is without boundary, we obtain a Liouville type Theorem for weakly p-harmonic maps.Mathematics Subject Classification (2000): 58E20; 35J70 相似文献