Existence and concentration of ground state solutions for an exponentially critical Choquard equation involving mixed local-nonlocal operators

Abstract

We study the Choquard equation involving mixed local and nonlocal operators \[-2 u+2s(-)su+V(x)u=μ-2(1|x|μ*F(u))f(u) in 2,\] where \(>0\), \(s∈(0,1)\), \(0<μ<2\), \(f\) has Trudinger--Moser critical exponential growth, and \(F(t)=∫0tf(τ)\,dτ\). By variational methods, combined with the Trudinger--Moser inequality and compactness arguments adapted to the critical growth and the nonlocal interaction term, we prove the existence of ground state solutions and describe their concentration behavior as \(0+\).