Generalized Chern-Simons-Schrodinger system with critical exponential growth: the zero mass case

Abstract

We consider the existence of ground state solutions for a class of zero-mass Chern-Simons-Schr\"odinger systems \[ \ arrayll - u +A0 u+Σj=12Aj2 u=f(u)-a(x)|u|p-2u, ∂1A2-∂2A1=-12|u|2,~∂1A1+∂2A2=0, ∂1A0=A2|u|2,~ ∂2A0=-A1|u|2, array . \] where a: R2 R+ is an external potential, p∈(1,2) and f∈ C( R) denotes a nonlinearity that fulfills the critical exponential growth in the Trudinger-Moser sense at infinity. By introducing an improvement of the version of Trudinger-Moser inequality, we are able to investigate the existence of positive ground state solutions for the given system using variational method.