In this article, we give a new proof on the existence of infinitely many signchanging solutions for the following Brézis-Nirenberg problem with critical exponent and a Hardy potential -?u- μu/(|x|~2)= λu + |u|~2^(*-2)u in ?, u = 0 on ??,where ? is a smooth open bounded domain of R^N which contains the origin, 2~*=(2N)/(N-2) is the critical Sobolev exponent. More precisely, under the assumptions that N ≥ 7, μ∈ [0, -4),2and =(N-2)~2/4, we show that the problem admits infinitely many sign-changing solutions for each fixed λ > 0. Our proof is based on a combination of invariant sets method and Ljusternik-Schnirelman theory.
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