Uniqueness of positive solutions to the higher order Brezis-Nirenberg problem

Abstract

In this paper, we study the higher order Brezis-Nirenberg problem under the Navier boundary condition eq cases (-)m u= u+up & in \, , \\ u>0 & in \, , \\ u=- u=·s=(-)m-1 u=0 & on \, ∂ , cases where is a strictly convex smooth bounded domain in Rn with n ≥ 4m, m ∈ N+, ∈ (0,λ1), λ1 is the first Navier eigenvalue for (-)m in , and p=n+2mn-2m. We prove that the solutions of eq are unique if either close to λ1 or close to 0 and satisfies some symmetry assumptions. The proof is mainly based on our previous works about the blow up analysis and compactness result for solutions to higher order critical elliptic equations and the asymptotic behavior of solutions to eq.