Fine multibubble analysis in the higher-dimensional Brezis-Nirenberg problem

Abstract

For a bounded set ⊂ RN and a perturbation V ∈ C1(), we analyze the concentration behavior of a blow-up sequence of positive solutions to \[ - uε + ε V = N(N-2) uεN+2N-2 \] for dimensions N ≥ 4, which are non-critical in the sense of the Brezis--Nirenberg problem. For the general case of multiple concentration points, we prove that concentration points are isolated and characterize the vector of these points as a critical point of a suitable function derived from the Green's function of - on . Moreover, we give the leading order expression of the concentration speed. This paper, with a recent one by the authors (arXiv:2208.12337) in dimension N = 3, gives a complete picture of blow-up phenomena in the Brezis-Nirenberg framework.

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