Construction of Multi-Bubble Solutions for a System of Elliptic Equations arising in Rank Two Gauge Theory

Abstract

We study the existence of multi-bubble solutions for the following skew-symmetric Chern--Simons system equatione051 \ split & u1+12eu2(1-eu1)=4πΣi=12kδp1,i\\ & u2+12eu1(1-eu2)=4πΣi=12kδp2,i split in ., equation where k≥ 1 and is a flat tours in R2. It continues the joint work with ZhangHZ-2015, where we obtained the necessary conditions for the existence of bubbling solutions of Liouville type. Under nearly necessary conditions(see Theorem main-thm), we show that there exist a sequence of solutions (u1,, u2,) to e051 such that u1, and u2, blow up simultaneously at k points in as 0.