On the size of the singular set of minimizing harmonic maps into the 2-sphere in dimension four and higher

Abstract

We extend the results of our recent preprint [arXiv: 1811.00515] into higher dimensions n ≥ 4. For minimizing harmonic maps u∈ W1,2(,S2) from n-dimensional domains into the two dimensional sphere we prove: (1) An extension of Almgren and Lieb's linear law, namely \[Hn-3(sing u) C ∫∂ |∇T u|n-1 \,dHn-1;\] (2) An extension of Hardt and Lin's stability theorem, namely that the size of singular set is stable under small perturbations in W1,n-1 norm of the boundary.