s-stability for Ws,n/s-harmonic maps in homotopy groups
Abstract
We study s-dependence for minimizing Ws,n/s-harmonic maps u Sn S in homotopy classes. Sacks--Uhlenbeck theory shows that, for each s, minimizers exist in a generating subset of πn(S). We show that this generating subset can be chosen locally constant in s. We also show that as s varies the minimal Ws,n/s-energy in each homotopy class changes continuously. In particular, we provide progress to a question raised by Mironescu and Brezis--Mironescu.
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