Least-energy solutions of the Br\'ezis-Nirenberg problem in the non-coercive case in dimension 3

Abstract

Let be a bounded, smooth domain of Rn, n 3 and λ 0. We consider the celebrated Br\'ezis-Nirenberg problem: equationeq:critlambda:abs * \aligned - u -λ u & =|u|2*-2u & in , u & = 0 in ∂ , aligned. equation where 2* = 2nn-2. When n=3 we investigate the existence of least-energy solutions for this problem, that we define as having the lowest L2*() norm among all non-zero solutions. We prove that least-energy solutions of the Br\'ezis-Nirenberg problem exist when λ belongs to a left neighbourhood of any eigenvalue of - that we explicitly characterise by a positive mass assumption. We obtain in particular the first existence result for the Br\'ezis-Nirenberg problem on a general smooth bounded domain when n=3 and λ 1. In order to do this we introduce, for any λ 0, a new variational problem inspired from spectral-theoretic considerations which is as follows: for any u ∈ L2*(), u>0 a.e., we consider the principal eigenvalue of - -λ on the weighted space L2(, u2*-2 dx), whose value we then minimise over the set of normalised weights u 2* = 1. When λ 1 this defines a new, non-smooth variational problem for which we develop a variational theory. We prove that its minimisers exist under the aforementioned positive mass assumption and that they yield least-energy solutions. We also obtain new results in the higher-dimensional case n 4, where we show that the energy function of the Br\'ezis-Nirenberg problem is discontinuous exactly at the eigenvalues of - .