Analyticity and infinite breakdown of regularity in mass-subcritical Hartree scattering

Abstract

We study the asymptotic behavior of solutions to the defocusing mass-subcritical Hartree NLS iut + u = F(u) = (|x|-γ*|u|2)u on Rd, d≥ 2, 43 < γ < 2. We show that the scattering problem associated to this equation is analytically well-posed in the weighted spaces = H11 and FH1. Furthermore, we show that the same problem fails to be analytically well-posed for data in L2. This constitutes an infinite loss of regularity between the scattering problems in weighted spaces and in L2. This further develops an earlier investigation initiated by the author in which a finite breakdown of regularity was proved for the L2 scattering problem for the mass-subcritical NLS with power nonlinearity F(u) = |u|pu.