Existence of groundstates for a class of nonlinear Choquard equations
Abstract
We prove the existence of a nontrivial solution (u ∈ H1 (N)) to the nonlinear Choquard equation [- u + u = (Iα F (u)) F' (u) in (N),] where (Iα) is a Riesz potential, under almost necessary conditions on the nonlinearity (F) in the spirit of Berestycki and Lions. This solution is a groundstate; if moreover (F) is even and monotone on ((0,∞)), then (u) is of constant sign and radially symmetric.
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