Existence of solutions to a perturbed critical biharmonic equation with Hardy potential

Abstract

\ In this paper, the following biharmonic elliptic problem eqnarray* cases 2u-λ|u|q-2u|x|s=|u|2**-2u+ f(x,u), &x∈,\\ u=∂ u∂ n=0, &x∈∂ cases eqnarray* is considered. The main feature of the equation is that it involves a Hardy term and a nonlinearity with critical Sobolev exponent. By combining a careful analysis of the fibering maps of the energy functional associated with the problem with the Mountain Pass Lemma, it is shown, for some positive parameter λ depending on s and q, that the problem admits at least one mountain pass type solution under appropriate growth conditions on the nonlinearity f(x,u).

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