Existence of harmonic maps into CAT(1) spaces
Abstract
Let ∈ C0 W1,2(, X) where is a compact Riemann surface, X is a compact locally CAT(1) space, and W1,2(,X) is defined as in Korevaar-Schoen. We use the technique of harmonic replacement to prove that either there exists a harmonic map u: X homotopic to or there exists a conformal harmonic map v: S2 X. To complete the argument, we prove compactness for energy minimizers and a removable singularity theorem for conformal harmonic maps.
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