Asymptotic behaviors of Landau-Lifshitz flows from R2 to K\"ahler manifolds

Abstract

In this paper, we study the asymptotic behaviors of finite energy solutions to the Landau-Lifshitz flows from R2 into K\"ahler manifolds. First, we prove that the solution with initial data below the critical energy converges to a constant map in the energy space as t ∞ for the compact Riemannian surface targets. In particular, when the target is a two dimensional sphere, we prove that the solution to the Landau-Lifshitz-Gilbert equation with initial data having an energy below 4π converges to some constant map in the energy space. Second, for general compact K\"ahler manifolds and initial data of an arbitrary finite energy, we obtain a bubbling theorem analogous to the Struwe's results on the heat flows.