On 3d dipolar Bose-Einstein condensates involving quantum fluctuations and three-body interactions

Abstract

We study the following nonlocal mixed order Gross-Pitaevskii equation i\,∂t =-12\, +Vext\,+λ1\,||2\,+λ2\,(K*||2)\,+λ3\,||p-2\,, where K is the classical dipole-dipole interaction kernel, λ3>0 and p∈(4,6]; the case p=6 being energy critical. For p=5 the equation is considered currently as the state-of-the-art model for describing the dynamics of dipolar Bose-Einstein condensates (Lee-Huang-Yang corrected dipolar GPE). We prove existence and nonexistence of standing waves in different parameter regimes; for p≠ 6 we prove global well-posedness and small data scattering.