Existence of sign-changing solution for a problem involving the fractional Laplacian with critical growth nonlinearities
Abstract
We study the existence of least energy sign-changing solution for the fractional equation (-)s u=|u|2s*-2u+λ f(x,u) in a smooth bounded domain of RN, u=0 in RN , where s∈ (0,1) and 2s* is the fractional critical Sobolev exponent. The proof is based on constrained minimization in a subset of Nehari manifold, containing all the possible sign-changing solutions of the equation.
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