Optimal quantitative stability of the M\"obius group of the sphere in all dimensions

Abstract

In any dimension n≥ 3, we prove an optimal stability estimate for the M\"obius group among maps u Sn-1 Rn, of the form ∈fλ>0,φ∈ M\"ob( Sn-1) ∫ Sn-1| 1λ ∇T u -∇ Tφ|n-1 d Hn-1 ≤ Cn En-1(u). Here, En-1(u) is a conformally invariant deficit which measures simultaneously lack of conformality and the deviation of u( Sn-1) from being a round sphere in an isoperimetric sense. This entails in particular the following qualitative statement: sequences with vanishing deficit, once appropriately normalized by the action of the M\"obius group, are compact. Both the qualitative and the quantitative results are new for all dimensions n≥ 4.