On Blow-Up of Positive Solutions for A Riharmonic Equation Involving Nearly Critical Exponent

In this paper a biharmonic problem with Navier boundary condition involving nearly critical growth is considered: △²=u^{(n+4)/(n-4)-r} u > 0 inΩ and u=△u=0 on ?Ω, where iΩs a bounded smooth convex domain in Rⁿ (n≥5) and r > 0 is small. We show that any sequence of positive solutions with r→0 has to blow up and concentrate at finitely many points in the interior of the domain ω. With blow-up argument, we also give the energy a priori estimate of positive solutions.