Multibubble blow-up analysis for the Brezis-Nirenberg problem in three dimensions

Abstract

For a smooth bounded domain ⊂ R3 and smooth functions a and V, we consider the asymptotic behavior of a sequence of positive solutions uε to - uε + (a+ε V) uε = uε5 on with zero Dirichlet boundary conditions, which blow up as ε 0. We derive the sharp blow-up rate and characterize the location of concentration points in the general case of multiple blow-up, thereby obtaining a complete picture of blow-up phenomena in the framework of the Brezis-Peletier conjecture in dimension N=3.