Groundstates for nonlinear fractional Choquard equations with general nonlinearities
Abstract
We study the following nonlinear Choquard equation driven by a fractional Laplacian: (-)su+ u =(|x|-μ F(u))f(u)|4.14mmin|1.14mm RN, with N≥3, s∈(0,1) and μ∈(0,N). By Supposing that the nonlinearities satisfy the general Berestycki-Lions type conditions BL, we are able to prove the existence of groundstates for this equation by variational methods.
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