Existence and asymptotic behaviors of solutions to Chern-Simons systems and equations on finite graphs
Abstract
In this paper, we consider a system of equations arising from the U(1)× U(1) Abelian Chern-Simons model eqnarray*\aligned u &=λ(a(b-a)eu-b(b-a)e+a2e2u-abe2+b(b-a)eu+ )+4πΣj=1k1mjδpj,\\ &=λ(-b(b-a)eu+a(b-a)e-abe2u+a2e2+b(b-a)eu+ )+4πΣj=1k2njδqj, aligned . eqnarray* on finite graphs. Here λ>0, b>a>0, mj>0\, (j=1,2,···,k1), nj>0\,(j=1,2,···,k2), δp is the Dirac delta mass at vertex p. We establish the iteration scheme and prove existence of solutions. We also develop a new method to get the asymptotic behaviors of solutions as λ goes to infinity. This method is also applicable to the Chern-Simons system \aligned u &=λe(eu-1) +4πΣj=1k1mjδpj,\\ &=λeu(e-1)+4πΣj=1k2njδqj, aligned . and the classical Chern-Simons equation u=λ eu(eu-1)+4πΣj=1Nδpj.
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