On well-posedness for inhomogeneous Hartree equations in the critical case

Abstract

We study the well-posedness for the inhomogeneous Hartree equation i∂t u + u = λ(Iα |·|-b|u|p)|x|-b|u|p-2u in Hs, s0. Until recently, its well-posedness theory has been intensively studied, focusing on solving the problem for the critical index p=1+2-2b+αn-2s with 0 s 1, but the case 1/2≤ s ≤ 1 is still an open problem. In this paper, we develop the well-posedness theory in this case, especially including the energy-critical case. To this end, we approach to the matter based on the Sobolev-Lorentz space which can lead us to perform a finer analysis for this equation. This is because it makes it possible to control the nonlinearity involving the singularity |x|-b as well as the Riesz potential Iα more effectively.

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