Symmetry and classification of positive standing waves of nonlinear Hartree type equations

Abstract

This paper presents some qualitative properties of positive solutions to the strongly coupled system \[ cases - Δu + τu = 2 pp + q ( Iα |v|q ) |u|p - 2 u &in ~ RN, \\ \\ - Δv + ηv = 2 qp + q ( Iα |u|p ) |v|q - 2 v &in ~ RN, cases \] with τ, η> 0, N ∈ N, 0 < α< N, \[ \1, 2 αN\ < p, q < 2* and 2 (N + α)N < p + q < 2α*, \] where Iα denotes the Riesz potential, \[ 2* := cases ∞, &if ~ N ∈ \1, 2\, \\ 2 NN - 2, &if ~ N ≥ 3, cases and 2α* := cases ∞, &if ~ N ∈ \1, 2\, \\ 2 (N + α)N - 2, &if ~ N ≥ 3. cases \] More precisely, by means of the moving planes method, we prove that positive solutions to this system are radially symmetric and strictly radially decreasing when p, q ≥ 2, and we obtain a classification result for positive ground states in the case p = q and τ= η.