Changhun Yang
Published 2023-12-21Version 1
We study the long time behavior of small solutions to the semi-relativistic Hartree equations in two dimension. The nonlinear term is convolved with the singular potential $|x|^{-\gamma}$ for $1<\gamma<2$, which is referred to as short-range interaction potential in the sense of scattering phenomenon. We establish the scattering results for small solutions in a weighted space, in other words, we prove that the nonlinear solutions exist globally and behave asymptotically like a linear solution whenever the initial data is sufficiently small. To achieve this, we should obtain time decay estimates for the nonlinear term which is integrable. A key observation is that the loss in time in the course of weighted energy estimates can be recovered by the space resonance method with the help of null structure.
Semilinear elliptic problems in $\mathbb{R}^N$: the interplay between the potential and the nonlinear term
Global well-posedness, scattering and blow-up for the energy-critical, focusing Hartree equation in the radial case
Global well-posedness and scattering for the mass-critical Hartree equation with radial data
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