On a m(x)$$ m(x) $$‐polyharmonic Kirchhoff problem without any growth near 0 and Ambrosetti–Rabinowitz conditions

In this paper, we study a higher order Kirchhoff problem with variable exponent of type M∫Ω|Dru|m(x)m(x)dxΔm(x)ru=f(x,u)inΩ,Dαu=0,on∂Ω,for eachα∈ℝNwith|α|≤r−1,$$ \left\{\begin{array}{ll}M\left({\int}_{\Omega}\frac{{\left|{\mathcal{D}}_ru\right|}^{m(x)}}{m(x)} dx\right){\Delta}_{m(x)}^ru=f\left(x,u\right)& \mathrm{in}\kern0.30em \Omega, \\ {}{D}^{\alpha }u=0,\kern0.30em & \mathrm{on}\kern0.30em \mathrm{\partial \Omega },\kern0.30em \mathrm{for}\ \mathrm{each}\kern0.4em \alpha \in {\mathrm{\mathbb{R}}}^N\kern0.4em \mathrm{with}\kern0.4em \mid \alpha \mid \le r-1,\end{array}\right. $$ where Ω⊂ℝN$$ \Omega \subset {\mathrm{\mathbb{R}}}^N $$ is a smooth bounded domain, r∈ℕ∗,m∈C(Ω‾),1