On fractional Schr\"odinger equations with Hartree type nonlinearities

Abstract

Goal of this paper is to study the following doubly nonlocal equation equationeqabstract (- )s u + μ u = (Iα*F(u))F'(u) in RN P equation in the case of general nonlinearities F ∈ C1(R) of Berestycki-Lions type, when N ≥ 2 and μ>0 is fixed. Here (-)s, s ∈ (0,1), denotes the fractional Laplacian, while the Hartree-type term is given by convolution with the Riesz potential Iα, α ∈ (0,N). We prove existence of ground states of eqabstract. Furthermore we obtain regularity and asymptotic decay of general solutions, extending some results contained in [25, 65].

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