Uniqueness of topological solutions of self-dual Chern-Simons equation with collapsing vortices

Abstract

We consider the following Chern-Simons equation, equation 0.1 u+ 12 eu(1-eu)=4πΣi=1N δpi, in , equation where is a 2-dimensional flat torus, >0 is a coupling parameter and δp stands for the Dirac measure concentrated at p. In this paper, we proved that the topological solutions of 0.1 are uniquely determined by the location of their vortices provided the coupling parameter is small and the collapsing velocity of vortices pi is slow enough or fast enough comparing with . This extends the uniqueness results of Choe Choe2005 and Tarantello Tarantello2007. Meanwhile, for any topological solution defined in R2 whose linearized operator is non-degenerate, we construct a sequence topological solutions u of 0.1 whose asymptotic limit is exactly after rescaling around 0. A consequence is that non-uniqueness of topological solutions in R2 implies non-uniqueness of topological solutions on torus with collapsing vortices.