Ground state solutions for weighted fourth-order Kirchhoff problem via Nehari method

Abstract

In this article, we study the following non local problem g(∫Bw(x) | u|2)(w(x) u) =|u|q-2u +\ f(x,u) in B, u=∂ u∂ n=0 on ∂ B, where B is the unit ball in R4 and w(x) is a singular weight of logarithm type. The non-linearity is a combination of a reaction source f(x,u) which is critical in view of exponential inequality of Adams' type and a polynomial function. The Kirchhoff function g is positive and continuous. By using the Nehari manifold method , the quantitative deformation lemma and degree theory results, we establish the existence of a ground state solution.