Well-posedness in weighted spaces for the generalized Hartree equation with p<2

Abstract

We investigate the well-posedness in the generalized Hartree equation iut + u + (|x|-(N-γ) |u|p)|u|p-2u=0, x ∈ RN, 0<γ<N, for low powers of nonlinearity, p<2. We establish the local well-posedness for a class of data in weighted Sobolev spaces, following ideas of Cazenave and Naumkin [6]. This crucially relies on the boundedness of the Riesz transform in weighted Lebesgue spaces. As a consequence, we obtain a class of data that exists globally, moreover, scatters in positive time. Furthermore, in the focusing case in the L2-supercritical setting we obtain a subset of locally well-posed data with positive energy, which blows up in finite time.