Sharp quantitative rigidity results for maps from S2 to S2 of general degree

Abstract

As the energy of any map v from S2 to S2 is at least 4π deg(v) with equality if and only if v is a rational map one might ask whether maps with small energy defect δv=E(v)-4π deg(v) are necessarily close to a rational map. While such a rigidity statement turns out to be false for maps of general degree, we will prove that any map v with small energy defect is essentially given by a collection of rational maps that describe the behaviour of v at very different scales and that the corresponding distance is controlled by a quantitative rigidity estimate of the form dist2≤ C δv(1+δv) which is indeed sharp.