The well-posedness and convergence of higher-order Hartree equations in critical Sobolev spaces on T3

Abstract

In this article, we consider Hartree equations generalised to 2p+1 order nonlinearities. These equations arise in the study of the mean-field limits of Bose gases with p-body interactions. We study their well-posedness properties in Hsc(T3), where T3 is the three dimensional torus and sc = 3/2 - 1/p is the scaling-critical regularity. The convergence of solutions of the Hartree equation to solutions of the nonlinear Schr\"odinger equation is proved. We also consider the case of mixed nonlinearities, proving local well-posedness in sc by considering the problem as a perturbation of the higher-order Hartree equation. In the particular case of the (defocusing) quintic-cubic Hartree equation, we also prove global well-posedness for all initial conditions in H1(T3). This is done by viewing it as a perturbation of the local quintic NLS.

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