On the existence and multiplicity of solutions for the N -Choquard logarithmic equation with exponential critical growth

Abstract

In the present work we briefly explain how to adapt techniques already used in fractional and p-fractional Laplacian cases to obtain the existence of a nontrivial solution at the mountain pass level and a nontrivial ground state solution, for the critical case, and the existence of infinitely many solutions, for the subcritical case, to the Choquard Logarithmic equation, -N u + a(x)|u|N-2u + λ (|·| |u|N)|u|N-2u = f(u) in RN , where a:RN → R , λ >0 , N ≥ 3 and f: R → [0, ∞) is continuous function that behaves like (α |u|NN-1) at infinity, for α >0 .