Asymptotic analysis for radial sign-changing solutions of the Brezis-Nirenberg problem

Abstract

We study the asymptotic behavior, as λ → 0, of least energy radial sign-changing solutions uλ, of the Brezis-Nirenberg problem equation* cases - u = λ u + |u|2* -2u & in\ B1\\ u=0 & on\ ∂ B1, cases equation* where λ >0, 2*=2nn-2 and B1 is the unit ball of n, n≥ 7. We prove that both the positive and negative part uλ+ and uλ- concentrate at the same point (which is the center) of the ball with different concentration speeds. Moreover we show that suitable rescalings of uλ+ and uλ- converge to the unique positive regular solution of the critical exponent problem in n. Precise estimates of the blow-up rate of \|uλ\|∞ are given, as well as asymptotic relations between \|uλ\|∞ and the nodal radius rλ. Finally we prove that, up to constant, λ-n-22n-8 uλ converges in Cloc1(B1-\0\) to G(x,0), where G(x,y) is the Green function of the Laplacian in the unit ball.