H\"older continuity of Minimizing Ws,p-Harmonic Maps
Abstract
We show that the mappings u∈ Ws,p(Rn,N) into manifolds N of a sufficiently simple topology that minimize the energy ∫Rn∫Rn|u(x)-u(y)|p|x-y|n+sp \;dx\;dy are locally H\"older continuous in a bounded domain outside a singular set with Hausdorff dimension strictly smaller than n-sp. We avoid the use of a monotonicity formula (which is unknown if p ≠ 2) by using a blow-up argument instead.
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