Energy asymptotics in the Brezis-Nirenberg problem. The higher-dimensional case

Abstract

For dimensions N ≥ 4, we consider the Br\'ezis-Nirenberg variational problem of finding \[ S(ε V) := ∈f0 u∈ H10() ∫ |∇ u|2 \, dx +ε ∫ V\, |u|2 \, dx(∫ |u|q \, dx )2/q, \] where q=2NN-2 is the critical Sobolev exponent and ⊂ RN is a bounded open set. We compute the asymptotics of S(0) - S(ε V) to leading order as ε 0+. We give a precise description of the blow-up profile of (almost) minimizing sequences and, in particular, we characterize the concentration points as being extrema of a quotient involving the Robin function. This complements the results from our recent paper in the case N = 3.