(p, N)-Choquard logarithmic equation involving a nonlinearity with exponential critical growth: existence and multiplicity

Abstract

The present work is concerned with the following version of Choquard Logarithmic equations -p u -N u + a|u|p-2u + b|u|N-2u + λ (|·| G(u))g(u) = f(u) in RN , where a, b, λ >0 , \N2, 2 \ < p< N , f, g: R → R are continuous functions that behave like (α |u|NN-1) at infinity, for α >0 , and that has polynomial growth, respectively, and G(s)=∫0sg(τ)dτ . We prove the existence of a nontrivial solution at the mountain pass level and a nontrivial ground state solution. Also, using a version of the Symmetric Mountain-Pass Theorem, we get infinitely many solutions.