On Choquard-Kirchhoff Type Critical Multiphase Problem

Abstract

In this paper, we obtain the existence of weak solutions to the Choquard-Kirchhoff type critical multiphase problem: equation* \arraycc &-M((∇ u))div(∇ up(x)-2∇ u+a1(x)∇ uq(x)-2∇ u+a2(x)∇ ur(x)-2∇ u) & =λ g(x)uγ(x)-2u+θ B(x,u)+ (∫F(y,u(y))x-yd(x,y)\, dy) f(x,u) \ in \ , & u=0 \ on \ ∂ . array. equation* The term B(x,u) on the right-hand side generalizes the critical growth. We obtain existence and multiplicity results by establishing certain embedding results and concentration compactness principle along with the Hardy-Littlewood-Sobolev type inequality for the Musielak Orlicz Sobolev space W1,T().