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We study the following Brézis–Nirenberg problem (Comm Pure Appl Math 36: 437–477, 1983): - u= u+ |u|^2^-2u, u H₀¹ (), where Ω is a bounded smooth domain of R N (N ≧ 7) and 2* is the critical Sobolev exponent. We show that, for each fixed λ > 0, this problem has infinitely many sign-changing solutions. In particular, if λ ≧ λ1, the Brézis–Nirenberg problem has and only has infinitely many sign-changing solutions except zero. The main tool is the estimates of Morse indices of nodal solutions.
Schechter et al. (Fri,) studied this question.