New class of sixth-order nonhomogeneous p(x)-Kirchhoff problems with sign-changing weight functions

Abstract

We prove the existence of multiple solutions for the following sixth-order p(x)-Kirchhoff-type problem: -M(∫ 1p(x)|∇ u|p(x)dx)3p(x) u = λ f(x)|u|q(x)-2u + g(x)|u|r(x)-2u + h(x) \ \ on \ and \ u= u=2 u=0 \ \ on \ ∂, where ⊂ RN is a smooth bounded domain, N > 3, p(x)3u = div((|∇ u|p(x)-2∇ u)) is the p(x)-triharmonic operator, p,q,r ∈ C(), 1< p(x) < N3 for all x∈ , M(s) = a - bsγ, a,b,γ>0, λ>0, g: × R R is a nonnegative continuous function while f,h : × R R are sign-changing continuous functions in . To the best of our knowledge, this paper is one of the first contributions to the study of the sixth-order p(x)-Kirchhoff type problems with sign changing Kirchhoff functions.