Kirchhoff type elliptic equations with double criticality in Musielak-Sobolev spaces

Abstract

This paper aims to establish the existence of a weak solution for the non-local problem: equation* \arrayll -a(∫H(x,|∇ u|)dx ) Hu &=f(x,u) \ \ in \ \ , \ \ \ \\ 3.3cm u &= 0 \ \ on \ \ ∂ , array. equation* where ⊂eq RN,\, N≥ 2 is a bounded and smooth domain containing two open and connected subsets p and N such that pN= and Hu=div( h(x,|∇ u|)∇ u) is the H-Laplace operator. We assume that H reduces to p(x) in p and to N in N, the non-linear function f:×R→ R act as |t|p(x)-2t on p and as eα|t|N/(N-1) on N for sufficiently large |t|. To establish our existence results in a Musielak-Sobolev space, we use a variational technique based on the mountain pass theorem.