Asymptotic profiles for Choquard equations with general critical nonlinearities

Abstract

In this paper, we study asymptotic behavior of positive ground state solutions for the nonlinear Choquard equation: equation0.1 - u+ u=(Iα F(u))F'(u), u∈ H1( RN), equation where F(u)=|u|N+αN-2+G(u), N≥3 is an integer, Iα is the Riesz potential of order α∈(0,N), and >0 is a parameter. Under some mild subcritical growth assumptions on G(u), we show that as ∞, the ground state solutions of 0.1, after a suitable rescaling, converge to a particular solution of the critical Choquard equation - u=N+αN-2(Iα*|u|N+αN-2)|u|N+αN-2-2u. We establish a novel sharp asymptotic characterisation of such a rescaling, which depends in a non-trivial way on the asymptotic behavior of G(u) at infinity and the space dimension N=3, N=4 or N≥5.

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