Approximate solutions to the Dirichlet problem for harmonic maps between hyperbolic spaces
Abstract
Our main result in this paper is the following: Given Hm, Hn hyperbolic spaces of dimensional m and n corresponding, and given a Holder function f=(s1,...,fn-1):∂ Hm ∂ Hn between geometric boundaries of Hm and Hn. Then for each ε >0 there exists a harmonic map u:Hm Hn which is continuous up to the boundary (in the sense of Euclidean) and u|∂ Hm=(f1,...,fn-1,ε).
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