The mixed fractional Hartree equations in Fourier amalgam and modulation spaces

Abstract

We prove local and global well-posedness for mixed fractional Hartree equation and with low regularity Cauchy data in Fourier amalgam W(Lp,q) and modulation Mp,q spaces. Similar results also hold for the Hartree equation with harmonic potential in some modulation spaces. Our approach also addresses Hartree-Fock equations of finitely many (but arbitrary large) particles. A key ingredient of our method is to establish trilinear estimates for Hartree non-linearity and the use of Strichartz estimates. As a consequence, we could gain W(Lp,q) and Mp,q-regularity for all p,q∈ [1, ∞]. In particular, we extend result of Bhimani-Grillakis-Okoudju bhimani2020hartree in Mp,q for all p,q and complement known results in Sobolev spaces.