Ground state solutions for fractional scalar field equations under a general critical nonlinearity
Abstract
In this paper we study existence of ground state solution to the following problem (- )αu = g(u) \ \ in \ \ RN, \ \ u ∈ Hα( RN) where (-)α is the fractional Laplacian, α∈ (0,1). We treat both cases N≥2 and N=1 with α=1/2. The function g is a general nonlinearity of Berestycki-Lions type which is allowed to have critical growth: polynomial in case N≥2, exponential if N=1.
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