Groundstates of nonlinear Choquard equations: Hardy-Littlewood-Sobolev critical exponent

Abstract

We consider nonlinear Choquard equation - u + V u = (Iα |u|αN+1) |u|αN-1 u (RN), where N 3, V ∈ L∞ (RN) is an external potential and Iα (x) is the Riesz potential of order α ∈ (0, N). The power αN+1 in the nonlocal part of the equation is critical with respect to the Hardy-Littlewood-Sobolev inequality. As a consequence, in the associated minimization problem a loss of compactness may occur. We prove that if |x| ∞ (1 - V (x))|x|2 > N2 (N - 2)4 (N + 1) then the equation has a nontrivial solution. We also discuss some necessary conditions for the existence of a solution. Our considerations are based on a concentration compactness argument and a nonlocal version of Brezis-Lieb lemma.