Influence of the curvature in the existence of solutions for a two Hardy-Sobolev critical exponents

Abstract

For N≥ 4, we let be a bounded domain of RN and be a closed curve contained in . We study existence of positive solutions u ∈ H10() to the equation equationAtusi - u+hu=λ-s1 u2*s1-1+-s2 u2*s2-1 in equation where h is a continuous function and is the distance function to . We prove the existence of a mountain pass solution for this Euler-Lagrange equation depending on the local geometry of the curve and the potential h.