Existence and multiplicity results for a new p(x)-Kirchhoff problem

Abstract

We study the existence and multiplicity results for the following nonlocal p(x)-Kirchhoff problem: equation 10 cases -(a-b∫1p(x)| ∇ u| p(x)dx)div(|∇ u| p(x)-2∇ u)=λ |u| p(x)-2u+g(x,u) in , \\ u=0, on ∂, cases equation where a≥ b > 0 are constants, ⊂ RN is a bounded smooth domain, p∈ C() with N>p(x)>1, λ is a real parameter and g is a continuous function. The analysis developed in this paper proposes an approach based on the idea of considering a new nonlocal term which presents interesting difficulties.