Non-degeneracy and quantitative stability of half-harmonic maps from ${\mathbb R}$ to ${\mathbb S}$

TL;DR

This paper proves the non-degeneracy and stability of half-harmonic maps from the real line to the sphere, providing a detailed analysis of their linearized operators and stability estimates for maps of various degrees.

Contribution

It establishes the non-degeneracy of all finite energy half-harmonic maps and develops quantitative stability estimates, including for maps near Blaschke products and higher degrees.

Findings

All finite energy half-harmonic maps are non-degenerate.

Quantitative stability estimates are valid for degree ±1 maps.

Stability estimates near Blaschke products are established, but not uniformly for degree 2.

Abstract

We consider half-harmonic maps from $\mathbb{R}$ (or $\mathbb{S}$) to $\mathbb{S}$. We prove that all (finite energy) half-harmonic maps are non-degenerate. In other words, they are integrable critical points of the energy functional. A full description of the kernel of the linearized operator around each half-harmonic map is given. The second part of this paper devotes to studying the quantitative stability of half-harmonic maps. When its degree is $\pm 1$, we prove that the deviation of any map $\boldsymbol{u}:\mathbb{R}\to \mathbb{S}$ from M\"obius transformations can be controlled uniformly by $\|\boldsymbol{u}\|_{\dot H^{1/2}(\mathbb{R})}^2-deg \boldsymbol{u}$. This result resembles the quantitative rigidity estimate of degree $\pm 1$ harmonic maps $\mathbb{R}^2\to \mathbb{S}^2$ which is proved recently. Furthermore, we address the quantitative stability for half-harmonic maps of higher degree. We prove that if $\boldsymbol{u}$ is already near to a Blaschke product, then the deviation of $\boldsymbol{u}$ to Blaschke products can be controlled by $\|\boldsymbol{u}\|_{\dot H^{1/2}(\mathbb{R})}^2-deg \boldsymbol{u}$. Additionally, a striking example is given to show that such quantitative estimate can not be true uniformly for all $\boldsymbol{u}$ of degree 2. We conjecture similar things happen for harmonic maps ${\mathbb R}^2\to {\mathbb S}^2$.