Quantitative stability of harmonic maps from R2 to S2 with higher degree

Abstract

For degree 1 harmonic maps from R2 (or S2) to S2, Bernand-Mantel, Muratov and Simon bernand2021quantitative recently establish a uniformly quantitative stability estimate. Namely, for any map u:R2 S2 with degree 1, the discrepancy of its Dirichlet energy and 4π can linearly control the H1-difference of u from the set of degree 1 harmonic maps. Whether a similar estimate holds for harmonic maps with higher degree is unknown. In this paper, we prove that a similar quantitative stability result for higher degree is true only in local sense. Namely, given a harmonic map, a similar estimate holds if u is already sufficiently near to it (modulo M\"obius transform) and the bound in general depends on the given harmonic map. More importantly, we investigate an example of degree 2 case thoroughly, which shows that it fails to have a uniformly quantitative estimate like the degree 1 case. This phenomenon show the striking difference of degree 1 ones and higher degree ones. Finally, we also conjecture a new uniformly quantitative stability estimate based on our computation.