Positive or sign-changing solutions for a critical semilinear nonlocal equation
Abstract
We consider the following critical semilinear nonlocal equation involving the fractional Laplacian (-)su=K(|x|)|u|2*s-2u,\ \ in\ \ RN, where K(|x|) is a positive radial function, N>2+2s, 0<s<1, and 2*s=2NN-2s. Under some asymptotic assumptions on K(x) at an extreme point, we show that this problem has infinitely many non-radial positive or sign-changing solutions.
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