On Non-topological Solutions of the G2 Chern-Simons System

Abstract

For any rank 2 of simple Lie algebra, the relativistic Chern-Simons system has the following form: equatione001 \arrayc u1+(Σi=12K1ieui -Σi=12Σj=12euiK1ieujKij)=4π Σj=1N1δpj\\ u2+ (Σi=12K2ieui-Σi=12Σj=12euiK2ieujKij)=4π Σj=1N2δqj array .in\; R2, equation where K is the Cartan matrix of rank 2. There are three Cartan matrix of rank 2: A2, B2 and G2. A long-standing open problem for e001 is the question of the existence of non-topological solutions. In a previous paper ALW, we have proven the existence of non-topological solutions for the A2 and B2 Chern-Simons system. In this paper, we continue to consider the G2 case. We prove the existence of non-topological solutions under the condition that either N2Σj=1N1 pj=N1 Σj=1N2 qj or N2Σj=1N1pj =N1 Σj=1N2 qj and N1,N2>1, |N1-N2|≠ 1. We solve this problem by a perturbation from the corresponding G2 Toda system with one singular source. Combining with ALW, we have proved the existence of non-topological solutions to the Chern-Simons system with Cartan matrix of rank 2.