Stability of Minimising Harmonic Maps under W1,p Perturbations of Boundary Data: p≥ 2

Abstract

Let ⊂ R3 be a Lipschitz domain, and consider a harmonic map v: → S2 with boundary data v|∂ = which minimises the Dirichlet energy. For p≥ 2, we show that any energy minimiser u whose boundary map has a small W1,p-distance to is close to v in H\"older norm modulo bi-Lipschitz homeomorphisms, provided that v is the unique minimiser attaining the boundary data. The index p=2 is sharp: the above stability result fails for p<2 due to the constructions by Almgren--Lieb al and Mazowiecka--Strzelecki ms.