Half-Harmonic Gradient Flow: Aspects of a Non-Local Geometric PDE

TL;DR

This paper investigates the half-harmonic gradient flow, establishing global weak solutions, analyzing finite-time bubbling phenomena, and providing an alternative local existence proof, thereby contributing to understanding its regularity and singularity behavior.

Contribution

It proves a global weak existence result, offers a new local existence proof via fixed-point methods, and explores the potential for finite-time bubbling in the half-harmonic gradient flow.

Findings

Established global weak existence of solutions.

Presented an alternative local existence proof.

Analyzed conditions for finite-time bubbling.

Abstract

The goal of this paper is to discuss some of the results in [31] and [32] and expand upon the work there by proving a global weak existence result as well as a first bubbling analysis in finite time. In addition, an alternative local existence proof is presented based on a fixed-point argument. This leads to two possible outlooks until a conjecture by Sire, Wei and Zheng is settled, see [27]: Either there always exists a global smooth solution (thus the solution constructed here is actually as regular as desired) or finite-time bubbling may occur in a similar way as for the harmonic gradient flow. In addition, in this paper, we give a brief summary of gradient flows, in particular the harmonic and half-harmonic one and we draw similarities between the two cases. For clarity, we restrict to the case of spherical target manifolds, but our entire discussion extends after taking care of technical details to arbitrary closed target manifolds.